RFC5639
Independent Submission M. Lochter Request for Comments: 5639 BSI Category: Informational J. Merkle ISSN: 2070-1721 secunet Security Networks
March 2010
Elliptic Curve Cryptography (ECC) Brainpool Standard
Curves and Curve Generation
Abstract
This memo proposes several elliptic curve domain parameters over finite prime fields for use in cryptographic applications. The domain parameters are consistent with the relevant international standards, and can be used in X.509 certificates and certificate revocation lists (CRLs), for Internet Key Exchange (IKE), Transport Layer Security (TLS), XML signatures, and all applications or protocols based on the cryptographic message syntax (CMS).
Status of This Memo
This document is not an Internet Standards Track specification; it is published for informational purposes.
This is a contribution to the RFC Series, independently of any other RFC stream. The RFC Editor has chosen to publish this document at its discretion and makes no statement about its value for implementation or deployment. Documents approved for publication by the RFC Editor are not a candidate for any level of Internet Standard; see Section 2 of RFC 5741.
Information about the current status of this document, any errata, and how to provide feedback on it may be obtained at http://www.rfc-editor.org/info/rfc5639.
Copyright Notice
Copyright (c) 2010 IETF Trust and the persons identified as the document authors. All rights reserved.
This document is subject to BCP 78 and the IETF Trust's Legal Provisions Relating to IETF Documents (http://trustee.ietf.org/license-info) in effect on the date of publication of this document. Please review these documents carefully, as they describe your rights and restrictions with respect to this document.
Contents
Introduction
Although several standards for elliptic curves and domain parameters exist (e.g., [ANSI1], [FIPS], or [SEC2]), some major issues have still not been addressed:
o Not all parameters have been generated in a verifiably pseudo-
random way. In particular, the seeds from which the curve parameters were derived have been chosen ad hoc, leaving out an essential part of the security proof.
o The primes selected for the base fields have a very special form
facilitating efficient implementation. This does not only contradict the approach of pseudo-random parameters, but also increases the risk of implementations violating one of the numerous patents for fast modular arithmetic with special primes.
o No proofs are provided that the proposed parameters do not belong
to those classes of parameters that are susceptible to cryptanalytic attacks with sub-exponential complexity.
o Recent research results seem to indicate a potential for new
attacks on elliptic curve cryptosystems. At least for applications with the highest security demands or under circumstances that complicate a change of parameters in response to new attacks, the inclusion of a corresponding security requirement for domain parameters (the class group condition, see Section 2) is justified.
o Some of the proposed subgroups have a non-trivial cofactor, which
demands additional checks by cryptographic applications to prevent small subgroup attacks (see [ANSI1] or [SEC1]).
o The domain parameters specified do not cover all bit lengths that
correspond to the commonly used key lengths for symmetric cryptographic algorithms. In particular, there is no 512-bit curve defined, but only one with a 521-bit length, which may be disadvantageous for some implementations.
Furthermore, many of the parameters specified by the existing standards are identical (see [SEC2] for a comparison). Thus, there is still a need for additional elliptic curve domain parameters that overcome the above limitations.
Scope and Relation to Other Specifications
This RFC specifies elliptic curve domain parameters over prime fields GF(p) with p having a length of 160, 192, 224, 256, 320, 384, and 512 bits. These parameters were generated in a pseudo-random, yet completely systematic and reproducible, way and have been verified to resist current cryptanalytic approaches. The parameters are compliant with ANSI X9.62 [ANSI1] and ANSI X9.63 [ANSI2], ISO/IEC 14888 [ISO1] and ISO/IEC 15946 [ISO2], ETSI TS 102 176-1 [ETSI], as well as with FIPS-186-2 [FIPS], and the Efficient Cryptography Group (SECG) specifications ([SEC1] and [SEC2]).
Furthermore, this document identifies the security and implementation requirements for the parameters, and describes the methods used for the pseudo-random generation of the parameters.
Finally, this RFC defines ASN.1 object identifiers for all elliptic curve domain parameter sets specified herein, e.g., for use in X.509 certificates.
This document does neither address the cryptographic algorithms to be used with the specified parameters nor their application in other standards. However, it is consistent with the following RFCs that specify the usage of elliptic curve cryptography in protocols and applications:
o RFC5753 for the cryptographic message syntax (CMS)
o RFC3279 and RFC5480 for X.509 certificates and CRLs
o RFC4050 for XML signatures
o RFC4492 for TLS
o RFC4754 for IKE
Requirements Language
The key words "MUST", "MUST NOT", "REQUIRED", "SHALL", "SHALL NOT", "SHOULD", "SHOULD NOT", "RECOMMENDED", "MAY", and "OPTIONAL" in this document are to be interpreted as described in RFC 2119 RFC2119.
Requirements on the Elliptic Curve Domain Parameters
Throughout this memo, let p > 3 be a prime and GF(p) a finite field (sometimes also referred to as Galois Field or GF(p)) with p elements. For given A and B with non-zero 4*A^3 + 27*B^2 mod p, the set of solutions (x,y) for the equation E: y^2 = x^3 + A*x + B mod p
over GF(p) together with a neutral element O and well-defined laws for addition and inversion define a group E(GF(p)) -- the group of GF(p) rational points on E. Typically, for cryptographic applications, an element G of prime order q is chosen in E(GF(p)).
A comprehensive introduction to elliptic curve cryptography can be found in [CFDA] and [BSS].
Note 1: We choose {0,...,p-1} as a set of representatives for the elements of GF(p). This choice induces a natural ordering on GF(p).
Security Requirements
The following security requirements are either motivated by known cryptographic analysis or aim to enhance trust in the recommended curves. As this specification aims at a particularly high level of security, a restrictive position is taken here. Nevertheless, it may be sensible to slightly deviate from these requirements for certain applications (e.g., in order to achieve higher computational performance). More details on requirements for cryptographically strong elliptic curves can be found in [CFDA] and [BSS].
1. Immunity to attacks using the Weil or Tate Pairing. These
attacks allow the embedding of the cyclic subgroup generated by G
into the group of units of a degree-l extension GF(p^l) of GF(p),
where sub-exponential attacks on the discrete logarithm problem
(DLP) exist. Here we have l = min{t | q divides p^t - 1}, i.e.,
l is the order of p mod q. By Fermat's Little Theorem, l divides
q-1. We require (q-1)/l < 100, which means that l is close to
the maximum possible value. This requirement is considerably
stronger than those of [SEC2] and [ANSI2] and also excludes
supersingular curves, as those are the curves of order p+1.
2. The trace is not equal to one. Trace one curves (or anomalous
curves) are curves with #E(GF(p)) = p. Satoh and Araki [SA], Semaev [Sem], and Smart [Sma] independently proposed efficient solutions to the elliptic curve discrete logarithm problem (ECDLP) on trace one curves. Note that these curves are also excluded by requirement 5 of Section 2.2.
3. Large class number. The class number of the maximal order of the
quotient field of the endomorphism ring End(E) of E is larger than 10^7. Generally, E cannot be "lifted" to a curve E' over an algebraic number field L with End(E) = End(E') unless the degree of L over the rationals is larger than the class number of End(E). Although there are no efficient attacks exploiting a small class number, recent work ([JMV] and [HR]) also may be seen as argument for the class number condition.
4. Prime group order. The group order #E(GF(p)) shall be a prime
number in order to counter small-subgroup attacks (see [HMV]). Therefore, all groups proposed in this RFC have cofactor 1. Note that curves with prime order have no point of order 2 and therefore no point with y-coordinate 0.
5. Verifiably pseudo-random. The elliptic curve domain parameters
shall be generated in a pseudo-random manner using seeds that are generated in a systematic and comprehensive way. The methods by which the parameters have been obtained are explained in Appendix A.
6. Proof of security. For all curves, a proof should be given that
all security requirements are met. These proofs are provided in [EBP].
In [BG], attacks are described that apply to elliptic curve domain parameters where q-1 has a factor u in the order of q^(1/3). However, the circumstances under which these attacks are applicable can be avoided in most applications. Therefore, no corresponding security requirement is stated here. However, it is highly recommended that developers verify the security of their implementations against this kind of attack.
Technical Requirements
Commercial demands and experience with existing implementations lead to the following technical requirements for the elliptic curve domain parameters.
1. For each of the bit lengths 160, 192, 224, 256, 320, 384, and
512, one curve shall be proposed. This requirement follows from the need for curves providing different levels of security that are appropriate for the underlying symmetric algorithms. The existing standards specify a 521-bit curve instead of a 512-bit curve.
2. The prime number p shall be congruent 3 mod 4. This requirement
allows efficient point compression: one method for the transmission of curve points P=(x,y) is to transmit only x and the least significant bit LSB(y) of y. For p = 3 mod 4, we get (y^2)^((p+1)/4) = y*y^((p-1)/2), which is either y or -y by Fermat's Little Theorem; hence, y can be computed very efficiently using the curve equation. This requirement is not always met by the parameters defined in existing standards.
3. The curves shall be GF(p)-isomorphic to a curve E': y^2 = x^3 +
A'*x + B' mod p with A' = -3 mod p. This property permits the use of the arithmetical advantages of curves with A = -3, as shown by Brier and Joyce [BJ]. For p = 3 mod 4, approximately half of the isomorphism classes of elliptic curves over GF(p) contain a curve E' with A' = -3 mod p. Precisely, if a curve is given by E: y^2 = x^3 + A*x + B mod p with -3 = A*u^4 being solvable in GF(p) and u=Z is a solution to this equation, then the requirement is fulfilled by means of the quadratic twist E': y^2 = x^3 + Z^4*A*x + Z^6*B mod p, and the GF(p)-isomorphism is given by F(x,y) := (x*Z^2, y*Z^3). Due to this isomorphism, E(GF(p)) and E'(GF(p)) have the same number of points, share the same algebraic structure, and hence offer the same level of security. This constraint has also been used by [SEC2] and [FIPS].
4. The prime p must not be of any special form; this requirement is
met by a verifiably pseudo-random generation of the parameters (see requirement 5 in Section 2.1). Although parameters specified by existing standards do not meet this requirement, the need for such curves over (pseudo-)randomly chosen fields has already been foreseen by the Standards for Efficient Cryptography Group (SECG), see [SEC2].
5. #E(GF(p)) < p. As a consequence of the Hasse-Weil Theorem, the
number of points #E(GF(p)) may be greater than the characteristic p of the prime field GF(p). In some cases, even the bit-length of #E(GF(p)) can exceed the bit-length of p. To avoid overruns in implementations, we require that #E(GF(p)) < p. In order to thwart attacks on digital signature schemes, some authors propose to use q > p, but the attacks described, e.g., in [BRS], appear infeasible in a well-designed Public Key Infrastructure (PKI).
6. B shall be a non-square mod p. Otherwise, the compressed
representations of the curve-points (0,0) and (0,X), with X being the square root of B with a least significant bit of 0, would be identical. As there are implementations of elliptic curves that encode the point at infinity as (0,0), we try to avoid ambiguities. Note that this condition is stable under quadratic twists as described in condition 3 above. Condition 6 makes the attack described in [G] impossible. It can therefore also be seen as a security requirement. This constraint has not been specified by existing standards.
Domain Parameter Specification
In this section, the elliptic curve domain parameters proposed are specified in the following way.
For all curves, an ID is given by which it can be referenced.
p is the prime specifying the base field.
A and B are the coefficients of the equation y^2 = x^3 + A*x + B mod p defining the elliptic curve.
G = (x,y) is the base point, i.e., a point in E of prime order, with x and y being its x- and y-coordinates, respectively.
q is the prime order of the group generated by G.
h is the cofactor of G in E, i.e., #E(GF(p))/q.
For the twisted curve, we also give the coefficient Z that defines the isomorphism F (see requirement 3 in Section 2.2).
The methods for the generation of the parameters are given in Appendix A. Proofs for the fulfillment of the security requirements specified in Section 2.1 are given in [EBP].
Domain Parameters for 160-Bit Curves
Curve-ID: brainpoolP160r1
p = E95E4A5F737059DC60DFC7AD95B3D8139515620F
A = 340E7BE2A280EB74E2BE61BADA745D97E8F7C300
B = 1E589A8595423412134FAA2DBDEC95C8D8675E58
x = BED5AF16EA3F6A4F62938C4631EB5AF7BDBCDBC3
y = 1667CB477A1A8EC338F94741669C976316DA6321
q = E95E4A5F737059DC60DF5991D45029409E60FC09
h = 1
- Twisted curve
Curve-ID: brainpoolP160t1
Z = 24DBFF5DEC9B986BBFE5295A29BFBAE45E0F5D0B
A = E95E4A5F737059DC60DFC7AD95B3D8139515620C
B = 7A556B6DAE535B7B51ED2C4D7DAA7A0B5C55F380
x = B199B13B9B34EFC1397E64BAEB05ACC265FF2378
y = ADD6718B7C7C1961F0991B842443772152C9E0AD
q = E95E4A5F737059DC60DF5991D45029409E60FC09
h = 1
Domain Parameters for 192-Bit Curves
Curve-ID: brainpoolP192r1
p = C302F41D932A36CDA7A3463093D18DB78FCE476DE1A86297
A = 6A91174076B1E0E19C39C031FE8685C1CAE040E5C69A28EF
B = 469A28EF7C28CCA3DC721D044F4496BCCA7EF4146FBF25C9
x = C0A0647EAAB6A48753B033C56CB0F0900A2F5C4853375FD6
y = 14B690866ABD5BB88B5F4828C1490002E6773FA2FA299B8F
q = C302F41D932A36CDA7A3462F9E9E916B5BE8F1029AC4ACC1
h = 1
- Twisted curve
Curve-ID: brainpoolP192t1
Z = 1B6F5CC8DB4DC7AF19458A9CB80DC2295E5EB9C3732104CB
A = C302F41D932A36CDA7A3463093D18DB78FCE476DE1A86294
B = 13D56FFAEC78681E68F9DEB43B35BEC2FB68542E27897B79
x = 3AE9E58C82F63C30282E1FE7BBF43FA72C446AF6F4618129
y = 097E2C5667C2223A902AB5CA449D0084B7E5B3DE7CCC01C9
q = C302F41D932A36CDA7A3462F9E9E916B5BE8F1029AC4ACC1
h = 1
Domain Parameters for 224-Bit Curves
Curve-ID: brainpoolP224r1
p = D7C134AA264366862A18302575D1D787B09F075797DA89F57EC8C0FF
A = 68A5E62CA9CE6C1C299803A6C1530B514E182AD8B0042A59CAD29F43
B = 2580F63CCFE44138870713B1A92369E33E2135D266DBB372386C400B
x = 0D9029AD2C7E5CF4340823B2A87DC68C9E4CE3174C1E6EFDEE12C07D
y = 58AA56F772C0726F24C6B89E4ECDAC24354B9E99CAA3F6D3761402CD
q = D7C134AA264366862A18302575D0FB98D116BC4B6DDEBCA3A5A7939F
h = 1
- Twisted curve
Curve-ID: brainpoolP224t1
Z = 2DF271E14427A346910CF7A2E6CFA7B3F484E5C2CCE1C8B730E28B3F
A = D7C134AA264366862A18302575D1D787B09F075797DA89F57EC8C0FC
B = 4B337D934104CD7BEF271BF60CED1ED20DA14C08B3BB64F18A60888D
x = 6AB1E344CE25FF3896424E7FFE14762ECB49F8928AC0C76029B4D580
y = 0374E9F5143E568CD23F3F4D7C0D4B1E41C8CC0D1C6ABD5F1A46DB4C
q = D7C134AA264366862A18302575D0FB98D116BC4B6DDEBCA3A5A7939F
h = 1
Domain Parameters for 256-Bit Curves
Curve-ID: brainpoolP256r1
p = A9FB57DBA1EEA9BC3E660A909D838D726E3BF623D52620282013481D1F6E5377
A = 7D5A0975FC2C3057EEF67530417AFFE7FB8055C126DC5C6CE94A4B44F330B5D9
B = 26DC5C6CE94A4B44F330B5D9BBD77CBF958416295CF7E1CE6BCCDC18FF8C07B6
x = 8BD2AEB9CB7E57CB2C4B482FFC81B7AFB9DE27E1E3BD23C23A4453BD9ACE3262
y = 547EF835C3DAC4FD97F8461A14611DC9C27745132DED8E545C1D54C72F046997
q = A9FB57DBA1EEA9BC3E660A909D838D718C397AA3B561A6F7901E0E82974856A7
h = 1
- Twisted curve
Curve-ID: brainpoolP256t1
Z = 3E2D4BD9597B58639AE7AA669CAB9837CF5CF20A2C852D10F655668DFC150EF0
A = A9FB57DBA1EEA9BC3E660A909D838D726E3BF623D52620282013481D1F6E5374
B = 662C61C430D84EA4FE66A7733D0B76B7BF93EBC4AF2F49256AE58101FEE92B04
x = A3E8EB3CC1CFE7B7732213B23A656149AFA142C47AAFBC2B79A191562E1305F4
y = 2D996C823439C56D7F7B22E14644417E69BCB6DE39D027001DABE8F35B25C9BE
q = A9FB57DBA1EEA9BC3E660A909D838D718C397AA3B561A6F7901E0E82974856A7
h = 1
Domain Parameters for 320-Bit Curves
Curve-ID: brainpoolP320r1
p = D35E472036BC4FB7E13C785ED201E065F98FCFA6F6F40DEF4F92B9EC7893EC 28FCD412B1F1B32E27
A = 3EE30B568FBAB0F883CCEBD46D3F3BB8A2A73513F5EB79DA66190EB085FFA9 F492F375A97D860EB4
B = 520883949DFDBC42D3AD198640688A6FE13F41349554B49ACC31DCCD884539 816F5EB4AC8FB1F1A6
x = 43BD7E9AFB53D8B85289BCC48EE5BFE6F20137D10A087EB6E7871E2A10A599 C710AF8D0D39E20611
y = 14FDD05545EC1CC8AB4093247F77275E0743FFED117182EAA9C77877AAAC6A C7D35245D1692E8EE1
q = D35E472036BC4FB7E13C785ED201E065F98FCFA5B68F12A32D482EC7EE8658 E98691555B44C59311
h = 1
- Twisted curve
Curve-ID: brainpoolP320t1
Z = 15F75CAF668077F7E85B42EB01F0A81FF56ECD6191D55CB82B7D861458A18F EFC3E5AB7496F3C7B1
A = D35E472036BC4FB7E13C785ED201E065F98FCFA6F6F40DEF4F92B9EC7893EC 28FCD412B1F1B32E24
B = A7F561E038EB1ED560B3D147DB782013064C19F27ED27C6780AAF77FB8A547 CEB5B4FEF422340353
x = 925BE9FB01AFC6FB4D3E7D4990010F813408AB106C4F09CB7EE07868CC136F FF3357F624A21BED52
y = 63BA3A7A27483EBF6671DBEF7ABB30EBEE084E58A0B077AD42A5A0989D1EE7 1B1B9BC0455FB0D2C3
q = D35E472036BC4FB7E13C785ED201E065F98FCFA5B68F12A32D482EC7EE8658 E98691555B44C59311
h = 1
Domain Parameters for 384-Bit Curves
Curve-ID: brainpoolP384r1
p = 8CB91E82A3386D280F5D6F7E50E641DF152F7109ED5456B412B1DA197FB711 23ACD3A729901D1A71874700133107EC53
A = 7BC382C63D8C150C3C72080ACE05AFA0C2BEA28E4FB22787139165EFBA91F9 0F8AA5814A503AD4EB04A8C7DD22CE2826
B = 04A8C7DD22CE28268B39B55416F0447C2FB77DE107DCD2A62E880EA53EEB62 D57CB4390295DBC9943AB78696FA504C11
x = 1D1C64F068CF45FFA2A63A81B7C13F6B8847A3E77EF14FE3DB7FCAFE0CBD10 E8E826E03436D646AAEF87B2E247D4AF1E
y = 8ABE1D7520F9C2A45CB1EB8E95CFD55262B70B29FEEC5864E19C054FF99129 280E4646217791811142820341263C5315
q = 8CB91E82A3386D280F5D6F7E50E641DF152F7109ED5456B31F166E6CAC0425 A7CF3AB6AF6B7FC3103B883202E9046565
h = 1
- Twisted curve
Curve-ID: brainpoolP384t1
Z = 41DFE8DD399331F7166A66076734A89CD0D2BCDB7D068E44E1F378F41ECBAE 97D2D63DBC87BCCDDCCC5DA39E8589291C
A = 8CB91E82A3386D280F5D6F7E50E641DF152F7109ED5456B412B1DA197FB711 23ACD3A729901D1A71874700133107EC50
B = 7F519EADA7BDA81BD826DBA647910F8C4B9346ED8CCDC64E4B1ABD11756DCE 1D2074AA263B88805CED70355A33B471EE
x = 18DE98B02DB9A306F2AFCD7235F72A819B80AB12EBD653172476FECD462AAB FFC4FF191B946A5F54D8D0AA2F418808CC
y = 25AB056962D30651A114AFD2755AD336747F93475B7A1FCA3B88F2B6A208CC FE469408584DC2B2912675BF5B9E582928
q = 8CB91E82A3386D280F5D6F7E50E641DF152F7109ED5456B31F166E6CAC0425 A7CF3AB6AF6B7FC3103B883202E9046565
h = 1
Domain Parameters for 512-Bit Curves
Curve-ID: brainpoolP512r1
p = AADD9DB8DBE9C48B3FD4E6AE33C9FC07CB308DB3B3C9D20ED6639CCA703308 717D4D9B009BC66842AECDA12AE6A380E62881FF2F2D82C68528AA6056583A48F3
A = 7830A3318B603B89E2327145AC234CC594CBDD8D3DF91610A83441CAEA9863 BC2DED5D5AA8253AA10A2EF1C98B9AC8B57F1117A72BF2C7B9E7C1AC4D77FC94CA
B = 3DF91610A83441CAEA9863BC2DED5D5AA8253AA10A2EF1C98B9AC8B57F1117 A72BF2C7B9E7C1AC4D77FC94CADC083E67984050B75EBAE5DD2809BD638016F723
x = 81AEE4BDD82ED9645A21322E9C4C6A9385ED9F70B5D916C1B43B62EEF4D009 8EFF3B1F78E2D0D48D50D1687B93B97D5F7C6D5047406A5E688B352209BCB9F822
y = 7DDE385D566332ECC0EABFA9CF7822FDF209F70024A57B1AA000C55B881F81 11B2DCDE494A5F485E5BCA4BD88A2763AED1CA2B2FA8F0540678CD1E0F3AD80892
q = AADD9DB8DBE9C48B3FD4E6AE33C9FC07CB308DB3B3C9D20ED6639CCA703308 70553E5C414CA92619418661197FAC10471DB1D381085DDADDB58796829CA90069
h = 1
- Twisted curve
Curve-ID: brainpoolP512t1
Z = 12EE58E6764838B69782136F0F2D3BA06E27695716054092E60A80BEDB212B 64E585D90BCE13761F85C3F1D2A64E3BE8FEA2220F01EBA5EEB0F35DBD29D922AB
A = AADD9DB8DBE9C48B3FD4E6AE33C9FC07CB308DB3B3C9D20ED6639CCA703308 717D4D9B009BC66842AECDA12AE6A380E62881FF2F2D82C68528AA6056583A48F0
B = 7CBBBCF9441CFAB76E1890E46884EAE321F70C0BCB4981527897504BEC3E36 A62BCDFA2304976540F6450085F2DAE145C22553B465763689180EA2571867423E
x = 640ECE5C12788717B9C1BA06CBC2A6FEBA85842458C56DDE9DB1758D39C031 3D82BA51735CDB3EA499AA77A7D6943A64F7A3F25FE26F06B51BAA2696FA9035DA
y = 5B534BD595F5AF0FA2C892376C84ACE1BB4E3019B71634C01131159CAE03CE E9D9932184BEEF216BD71DF2DADF86A627306ECFF96DBB8BACE198B61E00F8B332
q = AADD9DB8DBE9C48B3FD4E6AE33C9FC07CB308DB3B3C9D20ED6639CCA703308 70553E5C414CA92619418661197FAC10471DB1D381085DDADDB58796829CA90069
h = 1
Object Identifiers and ASN.1 Syntax
Object Identifiers
The root of the tree for the object identifiers defined in this specification is given by:
ecStdCurvesAndGeneration OBJECT IDENTIFIER::= {iso(1)
identified-organization(3) teletrust(36) algorithm(3) signature-
algorithm(3) ecSign(2) 8}
The object identifier ellipticCurve represents the tree for domain parameter sets. It has the following value:
ellipticCurve OBJECT IDENTIFIER ::= {ecStdCurvesAndGeneration 1}
The tree containing the object identifiers for each set of domain parameters defined in this RFC is:
versionOne OBJECT IDENTIFIER ::= {ellipticCurve 1}
The following object identifiers represent the domain parameter sets defined in this RFC:
brainpoolP160r1 OBJECT IDENTIFIER ::= {versionOne 1}
brainpoolP160t1 OBJECT IDENTIFIER ::= {versionOne 2}
brainpoolP192r1 OBJECT IDENTIFIER ::= {versionOne 3}
brainpoolP192t1 OBJECT IDENTIFIER ::= {versionOne 4}
brainpoolP224r1 OBJECT IDENTIFIER ::= {versionOne 5}
brainpoolP224t1 OBJECT IDENTIFIER ::= {versionOne 6}
brainpoolP256r1 OBJECT IDENTIFIER ::= {versionOne 7}
brainpoolP256t1 OBJECT IDENTIFIER ::= {versionOne 8}
brainpoolP320r1 OBJECT IDENTIFIER ::= {versionOne 9}
brainpoolP320t1 OBJECT IDENTIFIER ::= {versionOne 10}
brainpoolP384r1 OBJECT IDENTIFIER ::= {versionOne 11}
brainpoolP384t1 OBJECT IDENTIFIER ::= {versionOne 12}
brainpoolP512r1 OBJECT IDENTIFIER ::= {versionOne 13}
brainpoolP512t1 OBJECT IDENTIFIER ::= {versionOne 14}
ASN.1 Syntax for Usage with X.509 Certificates
The domain parameters specified in this RFC SHALL be used with X.509 certificates in accordance with RFC5480. In particular,
o the algorithm field of subjectPublicKeyInfo MUST be set to:
* id-ecPublicKey, if the algorithms that can be used with the
subject public key are not restricted, or
* id-ecDH to restrict the usage of the subject public key to
Elliptic Curve Diffie-Hellman (ECDH) key agreement, or
* id-ecMQV to restrict the usage of the subject public key to
Elliptic Curve Menezes-Qu-Vanstone (ECMQV) key agreement, and
o the field algorithm.parameter of subjectPublicKeyInfo MUST be of
type:
* namedCurve to specify the domain parameters by one of the
Object Identifiers (OIDs) defined in Section 4.1, or
* specifiedCurve to specify the domain parameters explicitly as
defined in RFC5480, or
* implicitCurve, if the domain parameters are found in an
issuer's certificate.
If the domain parameters are explicitly specified using the type specifiedCurve in the field algorithm.parameter of subjectPublicKeyInfo, ANSI X9.62 [ANSI1] and RFC5480 allow indicating whether or not a curve and base point have been generated verifiably in a pseudo-random way. Although the parameters specified in Section 3 have all been generated by the pseudo-random methods described in Appendix A, these algorithms deviate from those mandated in ANSI X9.62, A.3.3.1. Consequently, applications following ANSI X9.62 or RFC5480 will not be able to verify the pseudo-randomness of the parameters. In order to avoid rejection of the parameters, the ASN.1 encoding SHOULD NOT specify that the curve or base point has been generated verifiably at random. In particular, certification authorities (CAs) SHOULD set the contents of specifiedCurve in the following way:
o version is set to ecpVer1(1).
o fieldId includes the fieldType prime-field and as parameter the
value p of the selected domain parameters as specified in Section 3.
o curve includes the values a and b of the selected domain
parameters as specified in Section 3, but seed is absent.
o base is the octet string representation of the base point G of the
selected domain parameters as specified in Section 3.
o order is set to q of the selected domain parameters as specified
in Section 3.
o cofactor is set to 1.
o hash is absent.
Security Considerations
The level of security provided by symmetric ciphers and hash functions used in conjunction with the elliptic curve domain parameters specified in this RFC should roughly match or exceed the level provided by the domain parameters. The following table indicates the minimum key sizes for symmetric ciphers and hash functions providing at least (roughly) comparable security.
+--------------------+--------------------+-------------------------+ | elliptic curve | minimum length of | hash functions | | domain parameters | symmetric keys | | +--------------------+--------------------+-------------------------+ | brainpoolP160r1 | 80 | SHA-1, SHA-224, | | | | SHA-256, SHA-384, | | | | SHA-512 | | | | | | brainpoolP192r1 | 96 | SHA-224, SHA-256, | | | | SHA-384, SHA-512 | | | | | | brainpoolP224r1 | 112 | SHA-224, SHA-256, | | | | SHA-384, SHA-512 | | | | | | brainpoolP256r1 | 128 | SHA-256, SHA-384, | | | | SHA-512 | | | | | | brainpoolP320r1 | 160 | SHA-384, SHA-512 | | | | | | brainpoolP384r1 | 192 | SHA-384, SHA-512 | | | | | | brainpoolP512r1 | 256 | SHA-512 | +--------------------+--------------------+-------------------------+
Table 1
Security properties of the elliptic curve domain parameters specified in this RFC are discussed in Section 2.1. Further security discussions specific to elliptic curve cryptography can be found in [ANSI1] and [SEC1].
Intellectual Property Rights
The authors have no knowledge about any intellectual property rights that cover the usage of the domain parameters defined herein. However, readers should be aware that implementations based on these domain parameters may require use of inventions covered by patent rights.
References
Normative References
[ANSI1] American National Standards Institute, "Public Key
Cryptography For The Financial Services Industry: The
Elliptic Curve Digital Signature Algorithm (ECDSA)", ANSI
X9.62, 2005.
RFC2119 Bradner, S., "Key words for use in RFCs to Indicate
Requirement Levels", BCP 14, RFC 2119, March 1997.
RFC5480 Turner, S., Brown, D., Yiu, K., Housley, R., and T. Polk,
"Elliptic Curve Cryptography Subject Public Key
Information", RFC 5480, March 2009.
Informative References
[ANSI2] American National Standards Institute, "Public Key
Cryptography For The Financial Services Industry: Key
Agreement and Key Transport Using The Elliptic Curve
Cryptography", ANSI X9.63, 2001.
[BJ] Brier, E. and M. Joyce, "Fast Multiplication on Elliptic
Curves through Isogenies", Applied Algebra Algebraic
Algorithms and Error-Correcting Codes, Lecture Notes in
Computer Science 2643, Springer Verlag, 2003.
[BG] Brown, J. and R. Gallant, "The Static Diffie-Hellman
Problem", Centre for Applied Cryptographic Research,
University of Waterloo, Technical Report CACR 2004-10,
2005.
[BRS] Bohli, J., Roehrich, S., and R. Steinwandt, "Key
Substitution Attacks Revisited: Taking into Account
Malicious Signers", International Journal of Information
Security Volume 5, Issue 1, January 2006.
[BSS] Blake, I., Seroussi, G., and N. Smart, "Elliptic Curves in
Cryptography", Cambridge University Press, 1999.
[EBP] ECC Brainpool, "ECC Brainpool Standard Curves and Curve
Generation", October 2005, <http://www.ecc-brainpool.org/ download/Domain-parameters.pdf>.
[ETSI] European Telecommunications Standards Institute (ETSI),
"Algorithms and Parameters for Secure Electronic
Signatures, Part 1: Hash Functions and Asymmetric
Algorithms", TS 102 176-1, July 2005.
[FIPS] National Institute of Standards and Technology, "Digital
Signature Standard (DSS)", FIPS PUB 186-2, December 1998.
[G] Goubin, L., "A Refined Power-Analysis-Attack on Elliptic
Curve Cryptosystems", Proceedings of Public-Key-
Cryptography - PKC 2003, Lecture Notes in Computer Science
2567, Springer Verlag, 2003.
[CFDA] Cohen, H., Frey, G., Doche, C., Avanzi, R., Lange, T.,
Nguyen, K., and F. Vercauteren, "Handbook of Elliptic and
Hyperelliptic Curve Cryptography", Chapman & Hall CRC
Press, 2006.
[HMV] Hankerson, D., Menezes, A., and S. Vanstone, "Guide to
Elliptic Curve Cryptography", Springer Verlag, 2004.
[HR] Huang, M. and W. Raskind, "Signature Calculus and the
Discrete Logarithm Problem for Elliptic Curves
(Preliminary Version)", Unpublished Preprint, 2006,
<http://www-rcf.usc.edu/~mdhuang/mypapers/062806dl3.pdf>.
[ISO1] International Organization for Standardization,
"Information Technology - Security Techniques - Digital
Signatures with Appendix - Part 3: Discrete Logarithm
Based Mechanisms", ISO/IEC 14888-3, 2006.
[ISO2] International Organization for Standardization,
"Information Technology - Security Techniques -
Cryptographic Techniques Based on Elliptic Curves - Part
2: Digital signatures", ISO/IEC 15946-2, 2002.
[ISO3] International Organization for Standardization,
"Information Technology - Security Techniques - Prime
Number Generation", ISO/IEC 18032, 2005.
[JMV] Jao, D., Miller, SD., and R. Venkatesan, "Ramanujan Graphs
and the Random Reducibility of Discrete Log on Isogenous
Elliptic Curves", IACR Cryptology ePrint Archive 2004/312,
2004.
RFC3279 Bassham, L., Polk, W., and R. Housley, "Algorithms and
Identifiers for the Internet X.509 Public Key
Infrastructure Certificate and Certificate Revocation List
(CRL) Profile", RFC 3279, April 2002.
RFC4050 Blake-Wilson, S., Karlinger, G., Kobayashi, T., and Y.
Wang, "Using the Elliptic Curve Signature Algorithm
(ECDSA) for XML Digital Signatures", RFC 4050, April 2005.
RFC4492 Blake-Wilson, S., Bolyard, N., Gupta, V., Hawk, C., and B.
Moeller, "Elliptic Curve Cryptography (ECC) Cipher Suites
for Transport Layer Security (TLS)", RFC 4492, May 2006.
RFC4754 Fu, D. and J. Solinas, "IKE and IKEv2 Authentication Using
the Elliptic Curve Digital Signature Algorithm (ECDSA)",
RFC 4754, January 2007.
RFC5753 Turner, S. and D. Brown, "Use of Elliptic Curve
Cryptography (ECC) Algorithms in Cryptographic Message
Syntax (CMS)", RFC 5753, January 2010.
[SA] Satoh, T. and K. Araki, "Fermat Quotients and the
Polynomial Time Discrete Log Algorithm for Anomalous
Elliptic Curves", Commentarii Mathematici Universitatis
Sancti Pauli 47, 1998.
[SEC1] Certicom Research, "Elliptic Curve Cryptography",
Standards for Efficient Cryptography (SEC) 1, September
2000.
[SEC2] Certicom Research, "Recommended Elliptic Curve Domain
Parameters", Standards for Efficient Cryptography (SEC) 2,
September 2000.
[Sem] Semaev, I., "Evaluation of Discrete Logarithms on Some
Elliptic Curves", Mathematics of Computation 67, 1998.
[Sma] Smart, N., "The Discrete Logarithm Problem on Elliptic
Curves of Trace One", Journal of Cryptology 12, 1999.
Appendix A. Pseudo-Random Generation of Parameters
In this appendix, the methods used for pseudo-random generation of the elliptic curve domain parameters are described. A comprehensive description is given in [EBP].
Throughout this section the following conventions are used:
The conversion between integers x in the range 0 <= x <= 2^L - 1 and bit strings of length L is given by x <--> {x_1,...,x_L} and the binary expansion x = x_1 * 2^(L-1) + x_2 * 2^(L-2) + ... + x_(L-1)*2 + x_L, i.e., the first bit of the bit string corresponds to the most significant bit of the corresponding integer and the last bit to the least significant bit.
For a real number x, let floor(x) denote the highest integer less than or equal to x.
For updating the seed s of 160-bit length we use the following function update_seed(s):
1. Convert s to an integer z.
2. Convert (z+1) mod 2^160 to a bit string t and output t.
A.1. Generation of Prime Numbers
This section describes the systematic selection of the base fields GF(p) proposed in this specification. The prime generation method is similar to the method given in FIPS 186-2 [FIPS], Appendix 6.4, and ANSI X9.62 [ANSI1], A.3.2. It is a modification of the method "incremental search" given in Section 8.2.2 of [ISO3].
For computing an integer x in the range 0 <= x <= 2^L - 1 from a seed s of 160-bit length, we use the following algorithm find_integer(s):
1. Set v = floor((L-1)/160) and w = L - 160*v.
2. Compute h = SHA-1(s).
3. Let h_0 be the bit string obtained by taking the w rightmost bits
of h.
4. Convert s to an integer z.
5. For i from 1 to v do:
A. Set z_i = (z+i) mod 2^160.
B. Convert z_i to a bit string s_i.
C. Set h_i = SHA-1(s_i).
6. Let h be the string obtained by the concatenation of h_0,...,h_v
from left to right.
7. Convert h to an integer x and output x.
The following procedure is used to generate an L bit prime p from a 160-bit seed s.
1. Set c = find_integer(s).
2. Let p be the smallest prime p >= c with p = 3 mod 4.
3. If 2^(L-1) <= p <= 2^L - 1 output p and stop.
4. Set s = update_seed(s) and go to Step 1.
For the generation of the primes p used as base fields GF(p) for the curves defined in this specification (and the corresponding twisted curves), the following values (in hexadecimal representation) have been used as initial seed s:
Seed_p_160 for brainpoolP160r1: 3243F6A8885A308D313198A2E03707344A409382
Seed_p_192 for brainpoolP192r1: 2299F31D0082EFA98EC4E6C89452821E638D0137
Seed_p_224 for brainpoolP224r1: 7BE5466CF34E90C6CC0AC29B7C97C50DD3F84D5B
Seed_p_256 for brainpoolP256r1: 5B54709179216D5D98979FB1BD1310BA698DFB5A
Seed_p_320 for brainpoolP320r1: C2FFD72DBD01ADFB7B8E1AFED6A267E96BA7C904
Seed_p_384 for brainpoolP384r1: 5F12C7F9924A19947B3916CF70801F2E2858EFC1
Seed_p_512 for brainpoolP512r1: 6636920D871574E69A458FEA3F4933D7E0D95748
These seeds have been obtained as the first 7 substrings of 160-bit length each of Q = Pi*2^1120, where Pi is the constant 3.14159..., also known as Ludolph's number, i.e.,
Q = Seed_p_160||Seed_p_192||...||Seed_p_512||Remainder, where || denotes concatenation.
Using these seeds and the above algorithm the following primes are obtained:
p_160 = 1332297598440044874827085558802491743757193798159
p_192 = 4781668983906166242955001894344923773259119655253013193367
p_224 = 2272162293245435278755253799591092807334073214594499230443 5472941311
p_256 = 7688495639704534422080974662900164909303795020094305520373 5601445031516197751
p_320 = 1763593322239166354161909842446019520889512772719515192772 9604152886408688021498180955014999035278
p_384 = 2165927077011931617306923684233260497979611638701764860008 1618503821089934025961822236561982844534088440708417973331
p_512 = 8948962207650232551656602815159153422162609644098354511344 597187200057010413552439917934304191956942765446530386427345937963 894309923928536070534607816947
A.2. Generation of Pseudo-Random Curves
The generation procedure is similar to the procedure given in FIPS PUB 186-2 [FIPS], Appendix 6.4, and ANSI X9.62 [ANSI1], A.3.2.
For computing an integer x in the range 0 <= x <= 2^(L-1) - 1 from a seed s of 160-bit length, we use the algorithm find_integer_2(s), which slightly differs from the method used for the generation of the primes.
1. Set v = floor((L-1)/160) and w = L - 160*v - 1.
2. Compute h = SHA-1(s).
3. Let h_0 be the bit string obtained by taking the w rightmost bits
of h.
4. Convert s to an integer z.
5. For i from 1 to v do:
A. Set z_i = (z+i) mod 2^160.
B. Convert z_i to a bit string s_i.
C. Set h_i = SHA-1(s_i).
6. Let h be the string obtained by the concatenation of h_0,...,h_v
from left to right.
7. Convert h to an integer x and output x.
The following procedure is used to generate the parameters A and B of a suitable elliptic curve over GF(p) and a base point G from a prime p of bit length L and a 160-bit seed s.
1. Set h = find_integer_2(s).
2. Convert h to an integer A.
3. If -3 = A*Z^4 mod p is not solvable, then set s = update_seed(s)
and go to Step 1.
4. Compute one solution Z of -3 = A*Z^4 mod p.
5. Set s = update_seed(s).
6. Set B = find_integer_2(s).
7. If B is a square mod p, then set s = update_seed(s) and go to
Step 6.
8. If 4*A^3 + 27*B^2 = 0 mod p, then set s = update_seed(s) and go
to Step 1.
9. Check that the elliptic curve E over GF(p) given by y^2 = x^3 +
A*x + B fulfills all security and functional requirements given in Section 3. If not, then set s = update_seed(s) and go to Step 1.
10. Set s = update_seed(s).
11. Set k = find_integer_2(s).
12. Determine the points Q and -Q having the smallest x-coordinate in
E(GF(p)). Randomly select one of them as point P.
13. Compute the base point G = k * P.
14. Output A, B, and G.
Note: Of course P could also be used as a base point. However, the small x-coordinate of P could possibly render the curve vulnerable to side-channel attacks.
For the generation of curve parameters A and B, and the base points G defined in this specification, the following values (in hexadecimal representation) have been used as initial seed s:
Seed_ab_160 for brainpoolP160r1: 2B7E151628AED2A6ABF7158809CF4F3C762E7160
Seed_ab_192 for brainpoolP192r1: F38B4DA56A784D9045190CFEF324E7738926CFBE
Seed_ab_224 for brainpoolP224r1: 5F4BF8D8D8C31D763DA06C80ABB1185EB4F7C7B5
Seed_ab_256 for brainpoolP256r1: 757F5958490CFD47D7C19BB42158D9554F7B46BC
Seed_ab_320 for brainpoolP320r1: ED55C4D79FD5F24D6613C31C3839A2DDF8A9A276
Seed_ab_384 for brainpoolP384r1: BCFBFA1C877C56284DAB79CD4C2B3293D20E9E5E
Seed_ab_512 for brainpoolP384r1: AF02AC60ACC93ED874422A52ECB238FEEE5AB6AD
These seeds have been obtained as the first 7 substrings of 160-bit length each of R = floor(e*2^1120), where e denotes the constant 2.71828..., also known as Euler's number, i.e.,
R = Seed_ab_160||Seed_ab_192||...||Seed_ab_512||Remainder, where || denotes concatenation.
Authors' Addresses
Manfred Lochter Bundesamt fuer Sicherheit in der Informationstechnik (BSI) Postfach 200363 53133 Bonn Germany
Phone: +49 228 9582 5643 EMail: [email protected]
Johannes Merkle secunet Security Networks Mergenthaler Allee 77 65760 Eschborn Germany
Phone: +49 201 5454 2021 EMail: [email protected]
