RFC2539 - Storage of Diffie-Hellman Keys in the Domain Name System (DNS)

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　　Network Working Group D. Eastlake
Request for Comments: 2539 IBM
Category: Standards Track March 1999

Storage of Diffie-Hellman Keys in the Domain Name System (DNS)

Status of this Memo

This document specifies an Internet standards track protocol for the
Internet community, and requests discussion and suggestions for
improvements. Please refer to the current edition of the "Internet
Official Protocol Standards" (STD 1) for the standardization state
and status of this protocol. Distribution of this memo is unlimited.

Copyright Notice

Copyright (C) The Internet Society (1999). All Rights Reserved.

Abstract

A standard method for storing Diffie-Hellman keys in the Domain Name
System is described which utilizes DNS KEY resource records.

Acknowledgements

Part of the format for Diffie-Hellman keys and the description
thereof was taken from a work in progress by:

Ashar Aziz <ashar.aziz@eng.sun.com>
Tom Markson <markson@incog.com>
Hemma Prafullchandra <hemma@eng.sun.com>

In addition, the following person provided useful comments that have
been incorporated:

Ran Atkinson <rja@inet.org>
Thomas Narten <narten@raleigh.ibm.com>

Table of Contents

Abstract...................................................1
Acknowledgements...........................................1
1. Introduction............................................2
1.1 About This Document....................................2
1.2 About Diffie-Hellman...................................2
2. Diffie-Hellman KEY Resource Records.....................3
3. Performance Considerations..............................4
4. IANA Considerations.....................................4
5. Security Considerations.................................4
References.................................................5
Author's Address...........................................5
Appendix A: Well known prime/generator pairs...............6
A.1. Well-Known Group 1: A 768 bit prime..................6
A.2. Well-Known Group 2: A 1024 bit prime.................6
Full Copyright Notice......................................7

1. Introduction

The Domain Name System (DNS) is the current global hierarchical
replicated distributed database system for Internet addressing, mail
proxy, and similar information. The DNS has been extended to include
digital signatures and cryptographic keys as described in [RFC2535].
Thus the DNS can now be used for secure key distribution.

1.1 About This Document

This document describes how to store Diffie-Hellman keys in the DNS.
Familiarity with the Diffie-Hellman key exchange algorithm is assumed
[Schneier].

1.2 About Diffie-Hellman

Diffie-Hellman requires two parties to interact to derive keying
information which can then be used for authentication. Since DNS SIG
RRs are primarily used as stored authenticators of zone information
for many different resolvers, no Diffie-Hellman algorithm SIG RR is
defined. For example, assume that two parties have local secrets "i"
and "j". Assume they each respectively calculate X and Y as follows:

X = g**i ( mod p ) Y = g**j ( mod p )

They exchange these quantities and then each calculates a Z as
follows:

Zi = Y**i ( mod p ) Zj = X**j ( mod p )

shared secret between the two parties that an adversary who does not
know i or j will not be able to learn from the exchanged messages
(unless the adversary can derive i or j by performing a discrete
logarithm mod p which is hard for strong p and g).

The private key for each party is their secret i (or j). The public
key is the pair p and g, which must be the same for the parties, and
their individual X (or Y).

2. Diffie-Hellman KEY Resource Records

Diffie-Hellman keys are stored in the DNS as KEY RRs using algorithm
number 2. The structure of the RDATA portion of this RR is as shown
below. The first 4 octets, including the flags, protocol, and
algorithm fields are common to all KEY RRs as described in [RFC
2535]. The remainder, from prime length through public value is the
"public key" part of the KEY RR. The period of key validity is not in
the KEY RR but is indicated by the SIG RR(s) which signs and
authenticates the KEY RR(s) at that domain name.

1 1 1 1 1 1 1 1 1 1 2 2 2 2 2 2 2 2 2 2 3 3
0 1 2 3 4 5 6 7 8 9 0 1 2 3 4 5 6 7 8 9 0 1 2 3 4 5 6 7 8 9 0 1
+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+
| KEY flags | protocol | algorithm=2 |
+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+
| prime length (or flag) | prime (p) (or special) /
+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+
/ prime (p) (variable length) | generator length |
+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+
| generator (g) (variable length) |
+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+
| public value length | public value (variable length)/
+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+
/ public value (g^i mod p) (variable length) |
+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+-+

Prime length is length of the Diffie-Hellman prime (p) in bytes if it
is 16 or greater. Prime contains the binary representation of the
Diffie-Hellman prime with most significant byte first (i.e., in
network order). If "prime length" field is 1 or 2, then the "prime"
field is actually an unsigned index into a table of 65,536
prime/generator pairs and the generator length SHOULD be zero. See
Appedix A for defined table entries and Section 4 for information on
allocating additional table entries. The meaning of a zero or 3
through 15 value for "prime length" is reserved.

Generator length is the length of the generator (g) in bytes.
Generator is the binary representation of generator with most
significant byte first. PublicValueLen is the Length of the Public
Value (g**i (mod p)) in bytes. PublicValue is the binary
representation of the DH public value with most significant byte
first.

The corresponding algorithm=2 SIG resource record is not used so no
format for it is defined.

3. Performance Considerations

Current DNS implementations are optimized for small transfers,
typically less than 512 bytes including overhead. While larger
transfers will perform correctly and work is underway to make larger
transfers more efficient, it is still advisable to make reasonable
efforts to minimize the size of KEY RR sets stored within the DNS
consistent with adequate security. Keep in mind that in a secure
zone, an authenticating SIG RR will also be returned.

4. IANA Considerations

Assignment of meaning to Prime Lengths of 0 and 3 through 15 requires
an IETF consensus.

Well known prime/generator pairs number 0x0000 through 0x07FF can
only be assigned by an IETF standards action and this Proposed
Standard assigns 0x0001 through 0x0002. Pairs number 0s0800 through
0xBFFF can be assigned based on RFCdocumentation. Pairs number
0xC000 through 0xFFFF are available for private use and are not
centrally coordinated. Use of such private pairs outside of a closed
environment may result in conflicts.

5. Security Considerations

Many of the general security consideration in [RFC2535] apply. Keys
retrieved from the DNS should not be trusted unless (1) they have
been securely obtained from a secure resolver or independently
verified by the user and (2) this secure resolver and secure
obtainment or independent verification conform to security policies
acceptable to the user. As with all cryptographic algorithms,
evaluating the necessary strength of the key is important and
dependent on local policy.

In addition, the usual Diffie-Hellman key strength considerations
apply. (p-1)/2 should also be prime, g should be primitive mod p, p
should be "large", etc. [Schneier]

References

[RFC1034] Mockapetris, P., "Domain Names - Concepts and
Facilities", STD 13, RFC1034, November 1987.

[RFC1035] Mockapetris, P., "Domain Names - Implementation and
Specification", STD 13, RFC1035, November 1987.

[RFC2535] Eastlake, D., "Domain Name System Security Extensions",
RFC2535, March 1999.

[Schneier] Bruce Schneier, "Applied Cryptography: Protocols,
Algorithms, and Source Code in C", 1996, John Wiley and
Sons

Author's Address

Donald E. Eastlake 3rd
IBM
65 Shindegan Hill Road, RR #1
Carmel, NY 10512

Phone: +1-914-276-2668(h)
+1-914-784-7913(w)
Fax: +1-914-784-3833(w)
EMail: dee3@us.ibm.com

Appendix A: Well known prime/generator pairs

These numbers are copied from the IPSEC effort where the derivation
of these values is more fully explained and additional information is
available. Richard Schroeppel performed all the mathematical and
computational work for this appendix.

A.1. Well-Known Group 1: A 768 bit prime

The prime is 2^768 - 2^704 - 1 + 2^64 * { [2^638 pi] + 149686 }. Its
decimal value is
155251809230070893513091813125848175563133404943451431320235
119490296623994910210725866945387659164244291000768028886422
915080371891804634263272761303128298374438082089019628850917
0691316593175367469551763119843371637221007210577919

Prime modulus: Length (32 bit words): 24, Data (hex):
FFFFFFFF FFFFFFFF C90FDAA2 2168C234 C4C6628B 80DC1CD1
29024E08 8A67CC74 020BBEA6 3B139B22 514A0879 8E3404DD
EF9519B3 CD3A431B 302B0A6D F25F1437 4FE1356D 6D51C245
E485B576 625E7EC6 F44C42E9 A63A3620 FFFFFFFF FFFFFFFF

Generator: Length (32 bit words): 1, Data (hex): 2

A.2. Well-Known Group 2: A 1024 bit prime

The prime is 2^1024 - 2^960 - 1 + 2^64 * { [2^894 pi] + 129093 }.
Its decimal value is
179769313486231590770839156793787453197860296048756011706444
423684197180216158519368947833795864925541502180565485980503
646440548199239100050792877003355816639229553136239076508735
759914822574862575007425302077447712589550957937778424442426
617334727629299387668709205606050270810842907692932019128194
467627007

Prime modulus: Length (32 bit words): 32, Data (hex):
FFFFFFFF FFFFFFFF C90FDAA2 2168C234 C4C6628B 80DC1CD1
29024E08 8A67CC74 020BBEA6 3B139B22 514A0879 8E3404DD
EF9519B3 CD3A431B 302B0A6D F25F1437 4FE1356D 6D51C245
E485B576 625E7EC6 F44C42E9 A637ED6B 0BFF5CB6 F406B7ED
EE386BFB 5A899FA5 AE9F2411 7C4B1FE6 49286651 ECE65381
FFFFFFFF FFFFFFFF

Generator: Length (32 bit words): 1, Data (hex): 2

Full Copyright Statement

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