Network Working Group
Request for Comments: 2437
Obsoletes: 2313
Category: Informational
B. Kaliski
J. Staddon
RSA Laboratories
October 1998

PKCS #1: RSA Cryptography Specifications

Version 2.0

Status of this Memo

This memo provides information for the Internet community. It does not specify an Internet standard of any kind. Distribution of this memo is unlimited.

Copyright Notice

Copyright © The Internet Society (1998). All Rights Reserved.

Table of Contents

   1.       Introduction.....................................2
   1.1      Overview.........................................3
   2.       Notation.........................................3
   3.       Key types........................................5
   3.1      RSA public key...................................5
   3.2      RSA private key..................................5
   4.       Data conversion primitives.......................6
   4.1      I2OSP............................................6
   4.2      OS2IP............................................7
   5.       Cryptographic primitives.........................8
   5.1      Encryption and decryption primitives.............8
   5.1.1    RSAEP............................................8
   5.1.2    RSADP............................................9
   5.2      Signature and verification primitives...........10
   5.2.1    RSASP1..........................................10
   5.2.2    RSAVP1..........................................11
   6.       Overview of schemes.............................11
   7.       Encryption schemes..............................12
   7.1      RSAES-OAEP......................................13
   7.1.1    Encryption operation............................13
   7.1.2    Decryption operation............................14
   7.2      RSAES-PKCS1-v1_5................................15
   7.2.1    Encryption operation............................17
   7.2.2    Decryption operation............................17
   8.       Signature schemes with appendix.................18
   8.1      RSASSA-PKCS1-v1_5...............................19
   8.1.1    Signature generation operation..................20
   8.1.2    Signature verification operation................21
   9.       Encoding methods................................22
   9.1      Encoding methods for encryption.................22
   9.1.1    EME-OAEP........................................22
   9.1.2    EME-PKCS1-v1_5..................................24
   9.2      Encoding methods for signatures with appendix...26
   9.2.1    EMSA-PKCS1-v1_5.................................26
   10.      Auxiliary Functions.............................27
   10.1     Hash Functions..................................27
   10.2     Mask Generation Functions.......................28
   10.2.1   MGF1............................................28
   11.      ASN.1 syntax....................................29
   11.1     Key representation..............................29
   11.1.1   Public-key syntax...............................30
   11.1.2   Private-key syntax..............................30
   11.2     Scheme identification...........................31
   11.2.1   Syntax for RSAES-OAEP...........................31
   11.2.2   Syntax for RSAES-PKCS1-v1_5.....................32
   11.2.3   Syntax for RSASSA-PKCS1-v1_5....................33
   12       Patent Statement................................33
   12.1     Patent statement for the RSA algorithm..........34
   13.      Revision history................................35
   14.      References......................................35
            Security Considerations.........................37
            Acknowledgements................................37
            Authors' Addresses..............................38
            Full Copyright Statement........................39

1. Introduction

This memo is the successor to RFC 2313. This document provides recommendations for the implementation of public-key cryptography based on the RSA algorithm [18], covering the following aspects:

-cryptographic primitives
-encryption schemes
-signature schemes with appendix
-ASN.1 syntax for representing keys and for identifying the

       schemes

The recommendations are intended for general application within computer and communications systems, and as such include a fair amount of flexibility. It is expected that application standards based on these specifications may include additional constraints. The recommendations are intended to be compatible with draft standards currently being developed by the ANSI X9F1 [1] and IEEE P1363 working groups [14]. This document supersedes PKCS #1 version 1.5 [20].

Editor's note. It is expected that subsequent versions of PKCS #1 may cover other aspects of the RSA algorithm such as key size, key generation, key validation, and signature schemes with message recovery.

1.1 Overview

The organization of this document is as follows:

      -Section 1 is an introduction.
      -Section 2 defines some notation used in this document.
      -Section 3 defines the RSA public and private key types.
      -Sections 4 and 5 define several primitives, or basic mathematical
       operations. Data conversion primitives are in Section 4, and
       cryptographic primitives (encryption-decryption,
       signature-verification) are in Section 5.
      -Section 6, 7 and 8 deal with the encryption and signature schemes
       in this document. Section 6 gives an overview. Section 7 defines
       an OAEP-based [2] encryption scheme along with the method found
       in PKCS #1 v1.5.  Section 8 defines a signature scheme with
       appendix; the method is identical to that of PKCS #1 v1.5.
      -Section 9 defines the encoding methods for the encryption and
       signature schemes in Sections 7 and 8.
      -Section 10 defines the hash functions and the mask generation
       function used in this document.
      -Section 11 defines the ASN.1 syntax for the keys defined in
       Section 3 and the schemes gives in Sections 7 and 8.
      -Section 12 outlines the revision history of PKCS #1.
      -Section 13 contains references to other publications and
       standards.

2. Notation

   (n, e)        RSA public key
   
   c             ciphertext representative, an integer between 0 and n-1
   
   C             ciphertext, an octet string
   
   d             private exponent
   
   dP            p's exponent, a positive integer such that:
                  e(dP)\equiv 1 (mod(p-1))
   
   dQ            q's exponent, a positive integer such that:
                  e(dQ)\equiv 1 (mod(q-1))
   
   e             public exponent
   EM            encoded message, an octet string
   
   emLen         intended length in octets of an encoded message
   
   H             hash value, an output of Hash
   
   Hash          hash function
   
   hLen          output length in octets of hash function Hash
   
   K             RSA private key
   
   k             length in octets of the modulus
   
   l             intended length of octet string
   
   lcm(.,.)      least common multiple of two
                 nonnegative integers
   
   m             message representative, an integer between
                 0 and n-1
   
   M             message, an octet string
   
   MGF           mask generation function
   
   n             modulus
   
   P             encoding parameters, an octet string
   
   p,q           prime factors of the modulus
   
   qInv          CRT coefficient, a positive integer less
                 than p such: q(qInv)\equiv 1 (mod p)
   
   s             signature representative, an integer
                 between 0 and n-1
   
   S             signature, an octet string
   
   x             a nonnegative integer
   
   X             an octet string corresponding to x
   
   \xor          bitwise exclusive-or of two octet strings
   
   \lambda(n)    lcm(p-1, q-1), where n = pq
   ||            concatenation operator
   
   ||.||         octet length operator

3. Key types

Two key types are employed in the primitives and schemes defined in this document: RSA public key and RSA private key. Together, an RSA public key and an RSA private key form an RSA key pair.

3.1 RSA public key

For the purposes of this document, an RSA public key consists of two components:

n, the modulus, a nonnegative integer
e, the public exponent, a nonnegative integer

In a valid RSA public key, the modulus n is a product of two odd primes p and q, and the public exponent e is an integer between 3 and n-1 satisfying gcd (e, \lambda(n)) = 1, where \lambda(n) = lcm (p- 1,q-1). A recommended syntax for interchanging RSA public keys between implementations is given in Section 11.1.1; an implementation's internal representation may differ.

3.2 RSA private key

For the purposes of this document, an RSA private key may have either of two representations.

1. The first representation consists of the pair (n, d), where the components have the following meanings:

n, the modulus, a nonnegative integer
d, the private exponent, a nonnegative integer

2. The second representation consists of a quintuple (p, q, dP, dQ, qInv), where the components have the following meanings:

p, the first factor, a nonnegative integer
q, the second factor, a nonnegative integer
dP, the first factor's exponent, a nonnegative integer
dQ, the second factor's exponent, a nonnegative integer
qInv, the CRT coefficient, a nonnegative integer

In a valid RSA private key with the first representation, the modulus n is the same as in the corresponding public key and is the product of two odd primes p and q, and the private exponent d is a positive integer less than n satisfying:

   ed \equiv 1 (mod \lambda(n))

where e is the corresponding public exponent and \lambda(n) is as defined above.

In a valid RSA private key with the second representation, the two factors p and q are the prime factors of the modulus n, the exponents dP and dQ are positive integers less than p and q respectively satisfying

   e(dP)\equiv 1(mod(p-1))
   e(dQ)\equiv 1(mod(q-1)),

and the CRT coefficient qInv is a positive integer less than p satisfying:

q(qInv)\equiv 1 (mod p).

A recommended syntax for interchanging RSA private keys between implementations, which includes components from both representations, is given in Section 11.1.2; an implementation's internal representation may differ.

4. Data conversion primitives

Two data conversion primitives are employed in the schemes defined in this document:

   I2OSP: Integer-to-Octet-String primitive
   OS2IP: Octet-String-to-Integer primitive

For the purposes of this document, and consistent with ASN.1 syntax, an octet string is an ordered sequence of octets (eight-bit bytes). The sequence is indexed from first (conventionally, leftmost) to last (rightmost). For purposes of conversion to and from integers, the first octet is considered the most significant in the following conversion primitives

4.1 I2OSP

I2OSP converts a nonnegative integer to an octet string of a specified length.

   I2OSP (x, l)
   Input:
   x         nonnegative integer to be converted
   l         intended length of the resulting octet string
   
   Output:
   X         corresponding octet string of length l; or
             "integer too large"

Steps:

  1. If x>=256^l, output "integer too large" and stop.
  1. Write the integer x in its unique l-digit representation base 256:
   x = x_{l-1}256^{l-1} + x_{l-2}256^{l-2} +... + x_1 256 + x_0

where 0 <= x_i < 256 (note that one or more leading digits will be zero if x < 256^{l-1}).

3. Let the octet X_i have the value x_{l-i} for 1 <= i <= l. Output the octet string:

X = X_1 X_2 ... X_l.

4.2 OS2IP

OS2IP converts an octet string to a nonnegative integer.

   OS2IP (X)
   
   Input:
   X         octet string to be converted
   
   Output:
   x         corresponding nonnegative integer

Steps:

   1. Let X_1 X_2 ... X_l  be the octets of X from first to last, and
   let x{l-i} have value X_i for 1<= i <= l.
  1. Let x = x{l-1} 256^{l-1} + x_{l-2} 256^{l-2} +...+ x_1 256 + x_0.
  1. Output x.

5. Cryptographic primitives

Cryptographic primitives are basic mathematical operations on which cryptographic schemes can be built. They are intended for implementation in hardware or as software modules, and are not intended to provide security apart from a scheme.

Four types of primitive are specified in this document, organized in pairs: encryption and decryption; and signature and verification.

The specifications of the primitives assume that certain conditions are met by the inputs, in particular that public and private keys are valid.

5.1 Encryption and decryption primitives

An encryption primitive produces a ciphertext representative from a message representative under the control of a public key, and a decryption primitive recovers the message representative from the ciphertext representative under the control of the corresponding private key.

One pair of encryption and decryption primitives is employed in the encryption schemes defined in this document and is specified here: RSAEP/RSADP. RSAEP and RSADP involve the same mathematical operation, with different keys as input.

The primitives defined here are the same as in the draft IEEE P1363 and are compatible with PKCS #1 v1.5.

The main mathematical operation in each primitive is exponentiation.

5.1.1 RSAEP

   RSAEP((n, e), m)
   
   Input:
   (n, e)    RSA public key
   m         message representative, an integer between 0 and n-1
   
   Output:
   c         ciphertext representative, an integer between 0 and n-1;
             or "message representative out of range"
   
   Assumptions: public key (n, e) is valid

Steps:

1. If the message representative m is not between 0 and n-1, output message representative out of range and stop.

  1. Let c = m^e mod n.
  1. Output c.

5.1.2 RSADP

   RSADP (K, c)

Input:

   K         RSA private key, where K has one of the following forms
                 -a pair (n, d)
                 -a quintuple (p, q, dP, dQ, qInv)
   c         ciphertext representative, an integer between 0 and n-1
   
   Output:
   m         message representative, an integer between 0 and n-1; or
             "ciphertext representative out of range"

Assumptions:

private key K is valid

Steps:

1. If the ciphertext representative c is not between 0 and n-1, output "ciphertext representative out of range" and stop.

  1. If the first form (n, d) of K is used:
   2.1 Let m = c^d mod n.          Else, if the second form (p, q, dP,
   dQ, qInv) of K is used:

2.2 Let m_1 = c^dP mod p.

2.3 Let m_2 = c^dQ mod q.

2.4 Let h = qInv ( m_1 - m_2 ) mod p.

2.5 Let m = m_2 + hq.

  1. Output m.

5.2 Signature and verification primitives

A signature primitive produces a signature representative from a message representative under the control of a private key, and a verification primitive recovers the message representative from the signature representative under the control of the corresponding public key. One pair of signature and verification primitives is employed in the signature schemes defined in this document and is specified here: RSASP1/RSAVP1.

The primitives defined here are the same as in the draft IEEE P1363 and are compatible with PKCS #1 v1.5.

The main mathematical operation in each primitive is exponentiation, as in the encryption and decryption primitives of Section 5.1. RSASP1 and RSAVP1 are the same as RSADP and RSAEP except for the names of their input and output arguments; they are distinguished as they are intended for different purposes.

5.2.1 RSASP1

   RSASP1 (K, m)
   
   Input:
   K             RSA private key, where K has one of the following
                 forms:
                    -a pair (n, d)
                    -a quintuple (p, q, dP, dQ, qInv)
   
   m             message representative, an integer between 0 and n-1
   
   Output:
   s             signature representative, an integer between  0 and
                 n-1, or "message representative out of range"

Assumptions:
private key K is valid

Steps:

1. If the message representative m is not between 0 and n-1, output "message representative out of range" and stop.

  1. If the first form (n, d) of K is used:
   2.1 Let s = m^d mod n.          Else, if the second form (p, q, dP,
   dQ, qInv) of K is used:

2.2 Let s_1 = m^dP mod p.

2.3 Let s_2 = m^dQ mod q.

2.4 Let h = qInv ( s_1 - s_2 ) mod p.

2.5 Let s = s_2 + hq.

  1. Output S.

5.2.2 RSAVP1

   RSAVP1 ((n, e), s)
   
   Input:
   (n, e)  RSA public key
   s       signature representative, an integer between 0 and n-1
   
   Output:
   m       message representative, an integer between 0 and n-1;
           or "invalid"
   
   Assumptions:
   public key (n, e) is valid

Steps:

1. If the signature representative s is not between 0 and n-1, output "invalid" and stop.

  1. Let m = s^e mod n.
  1. Output m.

6. Overview of schemes

A scheme combines cryptographic primitives and other techniques to achieve a particular security goal. Two types of scheme are specified in this document: encryption schemes and signature schemes with appendix.

The schemes specified in this document are limited in scope in that their operations consist only of steps to process data with a key, and do not include steps for obtaining or validating the key. Thus, in addition to the scheme operations, an application will typically include key management operations by which parties may select public and private keys for a scheme operation. The specific additional operations and other details are outside the scope of this document.

As was the case for the cryptographic primitives (Section 5), the specifications of scheme operations assume that certain conditions are met by the inputs, in particular that public and private keys are valid. The behavior of an implementation is thus unspecified when a key is invalid. The impact of such unspecified behavior depends on the application. Possible means of addressing key validation include explicit key validation by the application; key validation within the public-key infrastructure; and assignment of liability for operations performed with an invalid key to the party who generated the key.

7. Encryption schemes

An encryption scheme consists of an encryption operation and a decryption operation, where the encryption operation produces a ciphertext from a message with a recipient's public key, and the decryption operation recovers the message from the ciphertext with the recipient's corresponding private key.

An encryption scheme can be employed in a variety of applications. A typical application is a key establishment protocol, where the message contains key material to be delivered confidentially from one party to another. For instance, PKCS #7 [21] employs such a protocol to deliver a content-encryption key from a sender to a recipient; the encryption schemes defined here would be suitable key-encryption algorithms in that context.

Two encryption schemes are specified in this document: RSAES-OAEP and RSAES-PKCS1-v1_5. RSAES-OAEP is recommended for new applications; RSAES-PKCS1-v1_5 is included only for compatibility with existing applications, and is not recommended for new applications.

The encryption schemes given here follow a general model similar to that employed in IEEE P1363, by combining encryption and decryption primitives with an encoding method for encryption. The encryption operations apply a message encoding operation to a message to produce an encoded message, which is then converted to an integer message representative. An encryption primitive is applied to the message representative to produce the ciphertext. Reversing this, the decryption operations apply a decryption primitive to the ciphertext to recover a message representative, which is then converted to an octet string encoded message. A message decoding operation is applied to the encoded message to recover the message and verify the correctness of the decryption.

7.1 RSAES-OAEP

RSAES-OAEP combines the RSAEP and RSADP primitives (Sections 5.1.1 and 5.1.2) with the EME-OAEP encoding method (Section 9.1.1) EME-OAEP is based on the method found in [2]. It is compatible with the IFES scheme defined in the draft P1363 where the encryption and decryption primitives are IFEP-RSA and IFDP-RSA and the message encoding method is EME-OAEP. RSAES-OAEP can operate on messages of length up to k-2- 2hLen octets, where hLen is the length of the hash function output for EME-OAEP and k is the length in octets of the recipient's RSA modulus. Assuming that the hash function in EME-OAEP has appropriate properties, and the key size is sufficiently large, RSAEP-OAEP provides "plaintext-aware encryption," meaning that it is computationally infeasible to obtain full or partial information about a message from a ciphertext, and computationally infeasible to generate a valid ciphertext without knowing the corresponding message. Therefore, a chosen-ciphertext attack is ineffective against a plaintext-aware encryption scheme such as RSAES-OAEP.

Both the encryption and the decryption operations of RSAES-OAEP take the value of the parameter string P as input. In this version of PKCS #1, P is an octet string that is specified explicitly. See Section 11.2.1 for the relevant ASN.1 syntax. We briefly note that to receive the full security benefit of RSAES-OAEP, it should not be used in a protocol involving RSAES-PKCS1-v1_5. It is possible that in a protocol on which both encryption schemes are present, an adaptive chosen ciphertext attack such as [4] would be useful.

Both the encryption and the decryption operations of RSAES-OAEP take the value of the parameter string P as input. In this version of PKCS #1, P is an octet string that is specified explicitly. See Section 11.2.1 for the relevant ASN.1 syntax.

7.1.1 Encryption operation

   RSAES-OAEP-ENCRYPT ((n, e), M, P)
   
   Input:
   (n, e)    recipient's RSA public key
   
   M         message to be encrypted, an octet string of length at
             most k-2-2hLen, where k is the length in octets of the
             modulus n and hLen is the length in octets of the hash
             function output for EME-OAEP
   
   P         encoding parameters, an octet string that may be empty
   Output:
   C         ciphertext, an octet string of length k; or "message too
             long"
   
   Assumptions: public key (n, e) is valid

Steps:

1. Apply the EME-OAEP encoding operation (Section 9.1.1.2) to the message M and the encoding parameters P to produce an encoded message EM of length k-1 octets:

   EM = EME-OAEP-ENCODE (M, P, k-1)

If the encoding operation outputs "message too long," then output "message too long" and stop.

2. Convert the encoded message EM to an integer message representative m: m = OS2IP (EM)

3. Apply the RSAEP encryption primitive (Section 5.1.1) to the public key (n, e) and the message representative m to produce an integer ciphertext representative c:

   c = RSAEP ((n, e), m)

4. Convert the ciphertext representative c to a ciphertext C of length k octets: C = I2OSP (c, k)

  1. Output the ciphertext C.

7.1.2 Decryption operation

   RSAES-OAEP-DECRYPT (K, C, P)
   
   Input:
   K          recipient's RSA private key
   C          ciphertext to be decrypted, an octet string of length
              k, where k is the length in octets of the modulus n
   P          encoding parameters, an octet string that may be empty
   
   Output:
   M          message, an octet string of length at most k-2-2hLen,
              where hLen is the length in octets of the hash
              function output for EME-OAEP; or "decryption error"

Steps:

1. If the length of the ciphertext C is not k octets, output "decryption error" and stop.

2. Convert the ciphertext C to an integer ciphertext representative c: c = OS2IP (C).

3. Apply the RSADP decryption primitive (Section 5.1.2) to the private key K and the ciphertext representative c to produce an integer message representative m:

   m = RSADP (K, c)

If RSADP outputs "ciphertext out of range," then output "decryption error" and stop.

4. Convert the message representative m to an encoded message EM of length k-1 octets: EM = I2OSP (m, k-1)

If I2OSP outputs "integer too large," then output "decryption error" and stop.

5. Apply the EME-OAEP decoding operation to the encoded message EM and the encoding parameters P to recover a message M:

   M = EME-OAEP-DECODE (EM, P)

If the decoding operation outputs "decoding error," then output "decryption error" and stop.

  1. Output the message M.

Note. It is important that the error messages output in steps 4 and 5 be the same, otherwise an adversary may be able to extract useful information from the type of error message received. Error message information is used to mount a chosen-ciphertext attack on PKCS #1 v1.5 encrypted messages in [4].

7.2 RSAES-PKCS1-v1_5

RSAES-PKCS1-v1_5 combines the RSAEP and RSADP primitives with the EME-PKCS1-v1_5 encoding method. It is the same as the encryption scheme in PKCS #1 v1.5. RSAES-PKCS1-v1_5 can operate on messages of length up to k-11 octets, although care should be taken to avoid certain attacks on low-exponent RSA due to Coppersmith, et al. when long messages are encrypted (see the third bullet in the notes below and [7]).

RSAES-PKCS1-v1_5 does not provide "plaintext aware" encryption. In particular, it is possible to generate valid ciphertexts without knowing the corresponding plaintexts, with a reasonable probability of success. This ability can be exploited in a chosen ciphertext attack as shown in [4]. Therefore, if RSAES-PKCS1-v1_5 is to be used, certain easily implemented countermeasures should be taken to thwart the attack found in [4]. The addition of structure to the data to be encoded, rigorous checking of PKCS #1 v1.5 conformance and other redundancy in decrypted messages, and the consolidation of error messages in a client-server protocol based on PKCS #1 v1.5 can all be effective countermeasures and don't involve changes to a PKCS #1 v1.5-based protocol. These and other countermeasures are discussed in [5].

Notes. The following passages describe some security recommendations pertaining to the use of RSAES-PKCS1-v1_5. Recommendations from version 1.5 of this document are included as well as new recommendations motivated by cryptanalytic advances made in the intervening years.

-It is recommended that the pseudorandom octets in EME-PKCS1-v1_5 be generated independently for each encryption process, especially if the same data is input to more than one encryption process. Hastad's results [13] are one motivation for this recommendation.

-The padding string PS in EME-PKCS1-v1_5 is at least eight octets long, which is a security condition for public-key operations that prevents an attacker from recovering data by trying all possible encryption blocks.

-The pseudorandom octets can also help thwart an attack due to Coppersmith et al. [7] when the size of the message to be encrypted is kept small. The attack works on low-exponent RSA when similar messages are encrypted with the same public key. More specifically, in one flavor of the attack, when two inputs to RSAEP agree on a large fraction of bits (8/9) and low-exponent RSA (e = 3) is used to encrypt both of them, it may be possible to recover both inputs with the attack. Another flavor of the attack is successful in decrypting a single ciphertext when a large fraction (2/3) of the input to RSAEP is already known. For typical applications, the message to be encrypted is short (e.g., a 128-bit symmetric key) so not enough information will be known or common between two messages to enable the attack. However, if a long message is encrypted, or if part of a message is known, then the attack may be a concern. In any case, the RSAEP-OAEP scheme overcomes the attack.

7.2.1 Encryption operation

   RSAES-PKCS1-V1_5-ENCRYPT ((n, e), M)
   
   Input:
   (n, e)  recipient's RSA public key
   M       message to be encrypted, an octet string of length at
           most k-11 octets, where k is the length in octets of the
           modulus n
   
   Output:
   C       ciphertext, an octet string of length k; or "message too
           long"

Steps:

1. Apply the EME-PKCS1-v1_5 encoding operation (Section 9.1.2.1) to the message M to produce an encoded message EM of length k-1 octets:

   EM = EME-PKCS1-V1_5-ENCODE (M, k-1)

If the encoding operation outputs "message too long," then output "message too long" and stop.

2. Convert the encoded message EM to an integer message representative m: m = OS2IP (EM)

3. Apply the RSAEP encryption primitive (Section 5.1.1) to the public key (n, e) and the message representative m to produce an integer ciphertext representative c: c = RSAEP ((n, e), m)

4. Convert the ciphertext representative c to a ciphertext C of length k octets: C = I2OSP (c, k)

  1. Output the ciphertext C.

7.2.2 Decryption operation

   RSAES-PKCS1-V1_5-DECRYPT (K, C)
   
   Input:
   K       recipient's RSA private key
   C       ciphertext to be decrypted, an octet string of length k,
           where k is the length in octets of the modulus n
   
   Output:
   M       message, an octet string of length at most k-11; or
           "decryption error"

Steps:

1. If the length of the ciphertext C is not k octets, output "decryption error" and stop.

2. Convert the ciphertext C to an integer ciphertext representative c: c = OS2IP (C).

3. Apply the RSADP decryption primitive to the private key (n, d) and the ciphertext representative c to produce an integer message representative m: m = RSADP ((n, d), c).

If RSADP outputs "ciphertext out of range," then output "decryption error" and stop.

4. Convert the message representative m to an encoded message EM of length k-1 octets: EM = I2OSP (m, k-1)

If I2OSP outputs "integer too large," then output "decryption error" and stop.

5. Apply the EME-PKCS1-v1_5 decoding operation to the encoded message EM to recover a message M: M = EME-PKCS1-V1_5-DECODE (EM).

If the decoding operation outputs "decoding error," then output "decryption error" and stop.

  1. Output the message M.

Note. It is important that only one type of error message is output by EME-PKCS1-v1_5, as ensured by steps 4 and 5. If this is not done, then an adversary may be able to use information extracted form the type of error message received to mount a chosen-ciphertext attack such as the one found in [4].

8. Signature schemes with appendix

A signature scheme with appendix consists of a signature generation operation and a signature verification operation, where the signature generation operation produces a signature from a message with a signer's private key, and the signature verification operation verifies the signature on the message with the signer's corresponding public key. To verify a signature constructed with this type of scheme it is necessary to have the message itself. In this way, signature schemes with appendix are distinguished from signature schemes with message recovery, which are not supported in this document.

A signature scheme with appendix can be employed in a variety of applications. For instance, X.509 [6] employs such a scheme to authenticate the content of a certificate; the signature scheme with appendix defined here would be a suitable signature algorithm in that context. A related signature scheme could be employed in PKCS #7 [21], although for technical reasons, the current version of PKCS #7 separates a hash function from a signature scheme, which is different than what is done here.

One signature scheme with appendix is specified in this document: RSASSA-PKCS1-v1_5.

The signature scheme with appendix given here follows a general model similar to that employed in IEEE P1363, by combining signature and verification primitives with an encoding method for signatures. The signature generation operations apply a message encoding operation to a message to produce an encoded message, which is then converted to an integer message representative. A signature primitive is then applied to the message representative to produce the signature. The signature verification operations apply a signature verification primitive to the signature to recover a message representative, which is then converted to an octet string. The message encoding operation is again applied to the message, and the result is compared to the recovered octet string. If there is a match, the signature is considered valid. (Note that this approach assumes that the signature and verification primitives have the message-recovery form and the encoding method is deterministic, as is the case for RSASP1/RSAVP1 and EMSA-PKCS1-v1_5. The signature generation and verification operations have a different form in P1363 for other primitives and encoding methods.)

Editor's note. RSA Laboratories is investigating the possibility of including a scheme based on the PSS encoding methods specified in [3], which would be recommended for new applications.

8.1 RSASSA-PKCS1-v1_5

RSASSA-PKCS1-v1_5 combines the RSASP1 and RSAVP1 primitives with the EME-PKCS1-v1_5 encoding method. It is compatible with the IFSSA scheme defined in the draft P1363 where the signature and verification primitives are IFSP-RSA1 and IFVP-RSA1 and the message encoding method is EMSA-PKCS1-v1_5 (which is not defined in P1363). The length of messages on which RSASSA-PKCS1-v1_5 can operate is either unrestricted or constrained by a very large number, depending on the hash function underlying the message encoding method.

Assuming that the hash function in EMSA-PKCS1-v1_5 has appropriate properties and the key size is sufficiently large, RSASSA-PKCS1-v1_5 provides secure signatures, meaning that it is computationally infeasible to generate a signature without knowing the private key, and computationally infeasible to find a message with a given signature or two messages with the same signature. Also, in the encoding method EMSA-PKCS1-v1_5, a hash function identifier is embedded in the encoding. Because of this feature, an adversary must invert or find collisions of the particular hash function being used; attacking a different hash function than the one selected by the signer is not useful to the adversary.

8.1.1 Signature generation operation

   RSASSA-PKCS1-V1_5-SIGN (K, M)
   Input:
   K         signer's RSA private ke
   M         message to be signed, an octet string
   
   Output:
   S         signature, an octet string of length k, where k is the
             length in octets of the modulus n; "message too long" or
             "modulus too short"
   Steps:

1. Apply the EMSA-PKCS1-v1_5 encoding operation (Section 9.2.1) to the message M to produce an encoded message EM of length k-1 octets:

   EM = EMSA-PKCS1-V1_5-ENCODE (M, k-1)

If the encoding operation outputs "message too long," then output "message too long" and stop. If the encoding operation outputs "intended encoded message length too short" then output "modulus too short".

2. Convert the encoded message EM to an integer message representative m: m = OS2IP (EM)

3. Apply the RSASP1 signature primitive (Section 5.2.1) to the private key K and the message representative m to produce an integer signature representative s: s = RSASP1 (K, m)

4. Convert the signature representative s to a signature S of length k octets: S = I2OSP (s, k)

  1. Output the signature S.

8.1.2 Signature verification operation

   RSASSA-PKCS1-V1_5-VERIFY ((n, e), M, S)
   
   Input:
   (n, e)    signer's RSA public key
   M         message whose signature is to be verified, an octet string
   S         signature to be verified, an octet string of length k,
             where k is the length in octets of the modulus n

Output: "valid signature," "invalid signature," or "message too long", or "modulus too short"

Steps:

1. If the length of the signature S is not k octets, output "invalid signature" and stop.

  1. Convert the signature S to an integer signature representative s:

s = OS2IP (S)

3. Apply the RSAVP1 verification primitive (Section 5.2.2) to the public key (n, e) and the signature representative s to produce an integer message representative m:

   m = RSAVP1 ((n, e), s)                  If RSAVP1 outputs "invalid"
   then output "invalid signature" and stop.

4. Convert the message representative m to an encoded message EM of length k-1 octets: EM = I2OSP (m, k-1)

If I2OSP outputs "integer too large," then output "invalid signature" and stop.

5. Apply the EMSA-PKCS1-v1_5 encoding operation (Section 9.2.1) to the message M to produce a second encoded message EM' of length k-1 octets:

   EM' = EMSA-PKCS1-V1_5-ENCODE (M, k-1)

If the encoding operation outputs "message too long," then output "message too long" and stop. If the encoding operation outputs "intended encoded message length too short" then output "modulus too short".

6. Compare the encoded message EM and the second encoded message EM'. If they are the same, output "valid signature"; otherwise, output "invalid signature."

9. Encoding methods

Encoding methods consist of operations that map between octet string messages and integer message representatives.

Two types of encoding method are considered in this document: encoding methods for encryption, encoding methods for signatures with appendix.

9.1 Encoding methods for encryption

An encoding method for encryption consists of an encoding operation and a decoding operation. An encoding operation maps a message M to a message representative EM of a specified length; the decoding operation maps a message representative EM back to a message. The encoding and decoding operations are inverses.

The message representative EM will typically have some structure that can be verified by the decoding operation; the decoding operation will output "decoding error" if the structure is not present. The encoding operation may also introduce some randomness, so that different applications of the encoding operation to the same message will produce different representatives.

Two encoding methods for encryption are employed in the encryption schemes and are specified here: EME-OAEP and EME-PKCS1-v1_5.

9.1.1 EME-OAEP

This encoding method is parameterized by the choice of hash function and mask generation function. Suggested hash and mask generation functions are given in Section 10. This encoding method is based on the method found in [2].

9.1.1.1 Encoding operation
   EME-OAEP-ENCODE (M, P, emLen)
   
   Options:
   Hash      hash function (hLen denotes the length in octet of the
             hash function output)
   MGF       mask generation function
   Input:
   M         message to be encoded, an octet string of length at most
             emLen-1-2hLen
   P         encoding parameters, an octet string
   emLen     intended length in octets of the encoded message, at least
             2hLen+1
   
   Output:
   EM        encoded message, an octet string of length emLen;
             "message too long" or "parameter string too long"

Steps:

1. If the length of P is greater than the input limitation for the hash function (2^61-1 octets for SHA-1) then output "parameter string too long" and stop.

  1. If ||M|| > emLen-2hLen-1 then output "message too long" and stop.

3. Generate an octet string PS consisting of emLen-||M||-2hLen-1 zero octets. The length of PS may be 0.

  1. Let pHash = Hash(P), an octet string of length hLen.

5. Concatenate pHash, PS, the message M, and other padding to form a data block DB as: DB = pHash || PS || 01 || M

  1. Generate a random octet string seed of length hLen.
  1. Let dbMask = MGF(seed, emLen-hLen).
  1. Let maskedDB = DB \xor dbMask.
  1. Let seedMask = MGF(maskedDB, hLen).
  1. Let maskedSeed = seed \xor seedMask.
  1. Let EM = maskedSeed || maskedDB.
  1. Output EM.
9.1.1.2 Decoding operation EME-OAEP-DECODE (EM, P)
   Options:
   Hash      hash function (hLen denotes the length in octet of the hash
             function output)
   
   MGF       mask generation function

Input:

   EM        encoded message, an octet string of length at least 2hLen+1
   P         encoding parameters, an octet string
   
   Output:
   M         recovered message, an octet string of length at most
             ||EM||-1-2hLen; or "decoding error"

Steps:

1. If the length of P is greater than the input limitation for the hash function (2^61-1 octets for SHA-1) then output "parameter string too long" and stop.

  1. If ||EM|| < 2hLen+1, then output "decoding error" and stop.

3. Let maskedSeed be the first hLen octets of EM and let maskedDB be the remaining ||EM|| - hLen octets.

  1. Let seedMask = MGF(maskedDB, hLen).
  1. Let seed = maskedSeed \xor seedMask.
  1. Let dbMask = MGF(seed, ||EM|| - hLen).
  1. Let DB = maskedDB \xor dbMask.
  1. Let pHash = Hash(P), an octet string of length hLen.

9. Separate DB into an octet string pHash' consisting of the first hLen octets of DB, a (possibly empty) octet string PS consisting of consecutive zero octets following pHash', and a message M as:

   DB = pHash' || PS || 01 || M

If there is no 01 octet to separate PS from M, output "decoding error" and stop.

  1. If pHash' does not equal pHash, output "decoding error" and stop.
  1. Output M.

9.1.2 EME-PKCS1-v1_5

This encoding method is the same as in PKCS #1 v1.5, Section 8: Encryption Process.

9.1.2.1 Encoding operation
   EME-PKCS1-V1_5-ENCODE (M, emLen)
   
   Input:
   M         message to be encoded, an octet string of length at most
             emLen-10
   emLen     intended length in octets of the encoded message
   
   Output:
   EM        encoded message, an octet string of length emLen; or
             "message too long"

Steps:

1. If the length of the message M is greater than emLen - 10 octets, output "message too long" and stop.

2. Generate an octet string PS of length emLen-||M||-2 consisting of pseudorandomly generated nonzero octets. The length of PS will be at least 8 octets.

3. Concatenate PS, the message M, and other padding to form the encoded message EM as:

   EM = 02 || PS || 00 || M
  1. Output EM.
9.1.2.2 Decoding operation
   EME-PKCS1-V1_5-DECODE (EM)
   
   Input:
   EM      encoded message, an octet string of length at least 10
   
   Output:
   M       recovered message, an octet string of length at most
           ||EM||-10; or "decoding error"

Steps:

1. If the length of the encoded message EM is less than 10, output "decoding error" and stop.

2. Separate the encoded message EM into an octet string PS consisting of nonzero octets and a message M as: EM = 02 || PS || 00 || M.

If the first octet of EM is not 02, or if there is no 00 octet to separate PS from M, output "decoding error" and stop.

3. If the length of PS is less than 8 octets, output "decoding error" and stop.

  1. Output M.

9.2 Encoding methods for signatures with appendix

An encoding method for signatures with appendix, for the purposes of this document, consists of an encoding operation. An encoding operation maps a message M to a message representative EM of a specified length. (In future versions of this document, encoding methods may be added that also include a decoding operation.)

One encoding method for signatures with appendix is employed in the encryption schemes and is specified here: EMSA-PKCS1-v1_5.

9.2.1 EMSA-PKCS1-v1_5

This encoding method only has an encoding operation.

   EMSA-PKCS1-v1_5-ENCODE (M, emLen)
   
   Option:
   Hash      hash function (hLen denotes the length in octet of the hash
             function output)
   
   Input:
   M         message to be encoded
   emLen     intended length in octets of the encoded message, at least
             ||T|| + 10, where T is the DER encoding of a certain value
             computed during the encoding operation
   
   Output:
   EM        encoded message, an octet string of length emLen; or "message
             too long" or "intended encoded message length too short"

Steps:

1. Apply the hash function to the message M to produce a hash value H:

H = Hash(M).

If the hash function outputs "message too long," then output "message too long".

2. Encode the algorithm ID for the hash function and the hash value into an ASN.1 value of type DigestInfo (see Section 11) with the Distinguished Encoding Rules (DER), where the type DigestInfo has the syntax

DigestInfo::=SEQUENCE{

     digestAlgorithm  AlgorithmIdentifier,
     digest OCTET STRING }

The first field identifies the hash function and the second contains the hash value. Let T be the DER encoding.

3. If emLen is less than ||T|| + 10 then output "intended encoded message length too short".

4. Generate an octet string PS consisting of emLen-||T||-2 octets with value FF (hexadecimal). The length of PS will be at least 8 octets.

5. Concatenate PS, the DER encoding T, and other padding to form the encoded message EM as: EM = 01 || PS || 00 || T

  1. Output EM.

10. Auxiliary Functions

This section specifies the hash functions and the mask generation functions that are mentioned in the encoding methods (Section 9).

10.1 Hash Functions

   Hash functions are used in the operations contained in Sections 7, 8
   and 9. Hash functions are deterministic, meaning that the output is
   completely determined by the input. Hash functions take octet strings
   of variable length, and generate fixed length octet strings. The hash
   functions used in the operations contained in Sections 7, 8 and 9
   should be collision resistant. This means that it is infeasible to
   find two distinct inputs to the hash function that produce the same
   output. A collision resistant hash function also has the desirable
   property of being one-way; this means that given an output, it is
   infeasible to find an input whose hash is the specified output. The
   property of collision resistance is especially desirable for RSASSA-
   PKCS1-v1_5, as it makes it infeasible to forge signatures. In
   addition to the requirements, the hash function should yield a mask
   generation function  (Section 10.2) with pseudorandom output.

Three hash functions are recommended for the encoding methods in this document: MD2 [15], MD5 [17], and SHA-1 [16]. For the EME-OAEP encoding method, only SHA-1 is recommended. For the EMSA-PKCS1-v1_5 encoding method, SHA-1 is recommended for new applications. MD2 and MD5 are recommended only for compatibility with existing applications based on PKCS #1 v1.5.

The hash functions themselves are not defined here; readers are referred to the appropriate references ([15], [17] and [16]).

Note. Version 1.5 of this document also allowed for the use of MD4 in signature schemes. The cryptanalysis of MD4 has progressed significantly in the intervening years. For example, Dobbertin [10] demonstrated how to find collisions for MD4 and that the first two rounds of MD4 are not one-way [11]. Because of these results and others (e.g. [9]), MD4 is no longer recommended. There have also been advances in the cryptanalysis of MD2 and MD5, although not enough to warrant removal from existing applications. Rogier and Chauvaud [19] demonstrated how to find collisions in a modified version of MD2. No one has demonstrated how to find collisions for the full MD5 algorithm, although partial results have been found (e.g. [8]). For new applications, to address these concerns, SHA-1 is preferred.

10.2 Mask Generation Functions

A mask generation function takes an octet string of variable length and a desired output length as input, and outputs an octet string of the desired length. There may be restrictions on the length of the input and output octet strings, but such bounds are generally very large. Mask generation functions are deterministic; the octet string output is completely determined by the input octet string. The output of a mask generation function should be pseudorandom, that is, if the seed to the function is unknown, it should be infeasible to distinguish the output from a truly random string. The plaintext- awareness of RSAES-OAEP relies on the random nature of the output of the mask generation function, which in turn relies on the random nature of the underlying hash.

One mask generation function is recommended for the encoding methods in this document, and is defined here: MGF1, which is based on a hash function. Future versions of this document may define other mask generation functions.

10.2.1 MGF1

MGF1 is a Mask Generation Function based on a hash function.

   MGF1 (Z, l)
   
   Options:
   Hash    hash function (hLen denotes the length in octets of the hash
           function output)
   
   Input:
   Z       seed from which mask is generated, an octet string
   l       intended length in octets of the mask, at most 2^32(hLen)
   
   Output:
   mask    mask, an octet string of length l; or "mask too long"

Steps:

1.If l > 2^32(hLen), output "mask too long" and stop.

   2.Let T  be the empty octet string.

3.For counter from 0 to \lceil{l / hLen}\rceil-1, do the following:

a.Convert counter to an octet string C of length 4 with the primitive I2OSP: C = I2OSP (counter, 4)

b.Concatenate the hash of the seed Z and C to the octet string T: T = T || Hash (Z || C)

4.Output the leading l octets of T as the octet string mask.

11. ASN.1 syntax

11.1 Key representation

This section defines ASN.1 object identifiers for RSA public and private keys, and defines the types RSAPublicKey and RSAPrivateKey. The intended application of these definitions includes X.509 certificates, PKCS #8 [22], and PKCS #12 [23].

The object identifier rsaEncryption identifies RSA public and private keys as defined in Sections 11.1.1 and 11.1.2. The parameters field associated with this OID in an AlgorithmIdentifier shall have type NULL.

   rsaEncryption OBJECT IDENTIFIER ::= {pkcs-1 1}

All of the definitions in this section are the same as in PKCS #1 v1.5.

11.1.1 Public-key syntax

An RSA public key should be represented with the ASN.1 type RSAPublicKey:

RSAPublicKey::=SEQUENCE{

     modulus INTEGER, -- n
     publicExponent INTEGER -- e }

(This type is specified in X.509 and is retained here for compatibility.)

The fields of type RSAPublicKey have the following meanings: -modulus is the modulus n.
-publicExponent is the public exponent e.

11.1.2 Private-key syntax

An RSA private key should be represented with ASN.1 type RSAPrivateKey:

RSAPrivateKey ::= SEQUENCE {

     version Version,
     modulus INTEGER, -- n
     publicExponent INTEGER, -- e
     privateExponent INTEGER, -- d
     prime1 INTEGER, -- p
     prime2 INTEGER, -- q
     exponent1 INTEGER, -- d mod (p-1)
     exponent2 INTEGER, -- d mod (q-1)
     coefficient INTEGER -- (inverse of q) mod p }
   
   Version ::= INTEGER

The fields of type RSAPrivateKey have the following meanings:

-version is the version number, for compatibility with future revisions of this document. It shall be 0 for this version of the document.
-modulus is the modulus n.
-publicExponent is the public exponent e.
-privateExponent is the private exponent d.
-prime1 is the prime factor p of n.
-prime2 is the prime factor q of n.
-exponent1 is d mod (p-1).
-exponent2 is d mod (q-1).
-coefficient is the Chinese Remainder Theorem coefficient q-1 mod p.

11.2 Scheme identification

This section defines object identifiers for the encryption and signature schemes. The schemes compatible with PKCS #1 v1.5 have the same definitions as in PKCS #1 v1.5. The intended application of these definitions includes X.509 certificates and PKCS #7.

11.2.1 Syntax for RSAES-OAEP

The object identifier id-RSAES-OAEP identifies the RSAES-OAEP encryption scheme.

   id-RSAES-OAEP OBJECT IDENTIFIER ::= {pkcs-1 7}

The parameters field associated with this OID in an AlgorithmIdentifier shall have type RSAEP-OAEP-params:

   RSAES-OAEP-params ::=  SEQUENCE {
     hashFunc [0] AlgorithmIdentifier {{oaepDigestAlgorithms}}
       DEFAULT sha1Identifier,
     maskGenFunc [1] AlgorithmIdentifier {{pkcs1MGFAlgorithms}}
       DEFAULT mgf1SHA1Identifier,
     pSourceFunc [2] AlgorithmIdentifier
       {{pkcs1pSourceAlgorithms}}
       DEFAULT pSpecifiedEmptyIdentifier }

The fields of type RSAES-OAEP-params have the following meanings:

-hashFunc identifies the hash function. It shall be an algorithm ID with an OID in the set oaepDigestAlgorithms, which for this version shall consist of id-sha1, identifying the SHA-1 hash function. The parameters field for id-sha1 shall have type NULL.

   oaepDigestAlgorithms ALGORITHM-IDENTIFIER ::= {
     {NULL IDENTIFIED BY id-sha1} }

id-sha1 OBJECT IDENTIFIER ::=

     {iso(1) identified-organization(3) oiw(14) secsig(3)
       algorithms(2) 26}
   
   The default hash function is SHA-1:
   sha1Identifier ::= AlgorithmIdentifier {id-sha1, NULL}

-maskGenFunc identifies the mask generation function. It shall be an algorithm ID with an OID in the set pkcs1MGFAlgorithms, which for this version shall consist of id-mgf1, identifying the MGF1 mask generation function (see Section 10.2.1). The parameters field for id-mgf1 shall have type AlgorithmIdentifier, identifying the hash function on which MGF1 is based, where the OID for the hash function shall be in the set oaepDigestAlgorithms.

   pkcs1MGFAlgorithms ALGORITHM-IDENTIFIER ::= {
     {AlgorithmIdentifier {{oaepDigestAlgorithms}} IDENTIFIED
       BY id-mgf1} }
   
   id-mgf1 OBJECT IDENTIFIER ::= {pkcs-1 8}

The default mask generation function is MGF1 with SHA-1:

mgf1SHA1Identifier ::= AlgorithmIdentifier {

     id-mgf1, sha1Identifier }

-pSourceFunc identifies the source (and possibly the value) of the encoding parameters P. It shall be an algorithm ID with an OID in the set pkcs1pSourceAlgorithms, which for this version shall consist of id-pSpecified, indicating that the encoding parameters are specified explicitly. The parameters field for id-pSpecified shall have type OCTET STRING, containing the encoding parameters.

   pkcs1pSourceAlgorithms ALGORITHM-IDENTIFIER ::= {
     {OCTET STRING IDENTIFIED BY id-pSpecified} }
   
   id-pSpecified OBJECT IDENTIFIER ::= {pkcs-1 9}

The default encoding parameters is an empty string (so that pHash in EME-OAEP will contain the hash of the empty string):

pSpecifiedEmptyIdentifier ::= AlgorithmIdentifier {

     id-pSpecified, OCTET STRING SIZE (0) }

If all of the default values of the fields in RSAES-OAEP-params are used, then the algorithm identifier will have the following value:

   RSAES-OAEP-Default-Identifier ::= AlgorithmIdentifier {
     id-RSAES-OAEP,
     {sha1Identifier,
      mgf1SHA1Identifier,
      pSpecifiedEmptyIdentifier } }

11.2.2 Syntax for RSAES-PKCS1-v1_5

The object identifier rsaEncryption (Section 11.1) identifies the RSAES-PKCS1-v1_5 encryption scheme. The parameters field associated with this OID in an AlgorithmIdentifier shall have type NULL. This is the same as in PKCS #1 v1.5.

   RsaEncryption   OBJECT IDENTIFIER ::= {PKCS-1 1}

11.2.3 Syntax for RSASSA-PKCS1-v1_5

The object identifier for RSASSA-PKCS1-v1_5 shall be one of the following. The choice of OID depends on the choice of hash algorithm: MD2, MD5 or SHA-1. Note that if either MD2 or MD5 is used then the OID is just as in PKCS #1 v1.5. For each OID, the parameters field associated with this OID in an AlgorithmIdentifier shall have type NULL.

If the hash function to be used is MD2, then the OID should be:

   md2WithRSAEncryption ::= {PKCS-1 2}

If the hash function to be used is MD5, then the OID should be:

   md5WithRSAEncryption ::= {PKCS-1 4}

If the hash function to be used is SHA-1, then the OID should be:

   sha1WithRSAEncryption ::= {pkcs-1 5}

In the digestInfo type mentioned in Section 9.2.1 the OIDS for the digest algorithm are the following:

id-SHA1 OBJECT IDENTIFIER ::=

           {iso(1) identified-organization(3) oiw(14) secsig(3)
            algorithms(2) 26 }

md2 OBJECT IDENTIFIER ::=

           {iso(1) member-body(2) US(840) rsadsi(113549)
            digestAlgorithm(2) 2}

md5 OBJECT IDENTIFIER ::=

           {iso(1) member-body(2) US(840) rsadsi(113549)
            digestAlgorithm(2) 5}

The parameters field of the digest algorithm has ASN.1 type NULL for these OIDs.

12. Patent statement

The Internet Standards Process as defined in RFC 1310 requires a written statement from the Patent holder that a license will be made available to applicants under reasonable terms and conditions prior to approving a specification as a Proposed, Draft or Internet Standard.

The Internet Society, Internet Architecture Board, Internet Engineering Steering Group and the Corporation for National Research Initiatives take no position on the validity or scope of the following patents and patent applications, nor on the appropriateness of the terms of the assurance. The Internet Society and other groups mentioned above have not made any determination as to any other intellectual property rights which may apply to the practice of this standard. Any further consideration of these matters is the user's responsibility.

12.1 Patent statement for the RSA algorithm

The Massachusetts Institute of Technology has granted RSA Data Security, Inc., exclusive sub-licensing rights to the following patent issued in the United States:

Cryptographic Communications System and Method ("RSA"), No. 4,405,829

RSA Data Security, Inc. has provided the following statement with regard to this patent:

It is RSA's business practice to make licenses to its patents available on reasonable and nondiscriminatory terms. Accordingly, RSA is willing, upon request, to grant non-exclusive licenses to such patent on reasonable and non-discriminatory terms and conditions to those who respect RSA's intellectual property rights and subject to RSA's then current royalty rate for the patent licensed. The royalty rate for the RSA patent is presently set at 2% of the licensee's selling price for each product covered by the patent. Any requests for license information may be directed to:

Director of Licensing
RSA Data Security, Inc.
2955 Campus Drive
Suite 400
San Mateo, CA 94403

A license under RSA's patent(s) does not include any rights to know- how or other technical information or license under other intellectual property rights. Such license does not extend to any activities which constitute infringement or inducement thereto. A licensee must make his own determination as to whether a license is necessary under patents of others.

13. Revision history

   Versions 1.0-1.3

Versions 1.0-1.3 were distributed to participants in RSA Data Security, Inc.'s Public-Key Cryptography Standards meetings in February and March 1991.

   Version 1.4

Version 1.4 was part of the June 3, 1991 initial public release of PKCS. Version 1.4 was published as NIST/OSI Implementors' Workshop document SEC-SIG-91-18.

   Version 1.5

Version 1.5 incorporates several editorial changes, including updates to the references and the addition of a revision history. The following substantive changes were made: -Section 10: "MD4 with RSA" signature and verification processes were added.

-Section 11: md4WithRSAEncryption object identifier was added.

   Version 2.0 [DRAFT]

Version 2.0 incorporates major editorial changes in terms of the document structure, and introduces the RSAEP-OAEP encryption scheme. This version continues to support the encryption and signature processes in version 1.5, although the hash algorithm MD4 is no longer allowed due to cryptanalytic advances in the intervening years.

14. References

[1] ANSI, ANSI X9.44: Key Management Using Reversible Public Key

Cryptography for the Financial Services Industry. Work in Progress.

   [2] M. Bellare and P. Rogaway. Optimal Asymmetric Encryption - How to
   
       Encrypt with RSA. In Advances in Cryptology-Eurocrypt '94, pp.
       92-111, Springer-Verlag, 1994.
   
   [3] M. Bellare and P. Rogaway. The Exact Security of Digital
       Signatures - How to Sign with RSA and Rabin. In Advances in
       Cryptology-Eurocrypt '96, pp. 399-416, Springer-Verlag, 1996.
   
   [4] D. Bleichenbacher. Chosen Ciphertext Attacks against Protocols
       Based on the RSA Encryption Standard PKCS #1. To appear in
       Advances in Cryptology-Crypto '98.
   
   [5] D. Bleichenbacher, B. Kaliski and J. Staddon. Recent Results on
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Security Considerations

Security issues are discussed throughout this memo.

Acknowledgements

This document is based on a contribution of RSA Laboratories, a division of RSA Data Security, Inc. Any substantial use of the text from this document must acknowledge RSA Data Security, Inc. RSA Data Security, Inc. requests that all material mentioning or referencing this document identify this as "RSA Data Security, Inc. PKCS #1 v2.0".

Authors' Addresses

   Burt Kaliski
   RSA Laboratories East
   20 Crosby Drive
   Bedford, MA  01730
   
   Phone: (617) 687-7000
   EMail: burt@rsa.com

Jessica Staddon
RSA Laboratories West
2955 Campus Drive
Suite 400
San Mateo, CA 94403

   Phone: (650) 295-7600
   EMail: jstaddon@rsa.com

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