[tahoe-dev] Fwd: Small-key DSA variant
David-Sarah Hopwood
david-sarah at jacaranda.org
Thu Aug 27 02:07:24 UTC 2009
Zooko Wilcox-O'Hearn wrote:
> The small-key variant I'm asking about goes back to the ElGamal
> verification equation:
>
> R^s / y^r = g^h mod p
>
> but instead of solving for R, we solve for y in a similar way:
>
> y = R^(s/r) / g^(h/r) mod p
>
> This means that with an ElGamal style (R,s) signature, the verifier
> can derive y = g^x mod p. So he doesn't have to know the public key.
> Instead of letting the public key be y, we can make it H(y) for some
> hash function H. Then the verification is:
>
> H(y) = H( R^(s/r) / g^(h/r) mod p )
>
> We have increased the signature size from twice the size of q to the
> sum of the sizes of p and q (which is much bigger, for typical non-EC
> DSA groups). But we have decreased the public key from the size of p to
> the size of H.
>
> Now the interesting question is whether H can be the size of the
> security
> parameter, rather than twice the size like q. Maybe we could use an 80
> bit H. This would make for a very small public key (again at the expense
> of a much larger signature).
>
> The idea would be that y is a fixed target, and a forger needs to come
> up with an R,s whose hash matches the hash of y. It's a second preimage
> problem, not a collision problem.
Hmm. If collisions on H are possible then an attacker can search for
two message/signature pairs with the same signature, (M1, (R,s)) and
(M2, (R,s)), such that the solutions for y have colliding hashes:
H(R^(s / r) / g^(h_M1 / r) mod p) = H(R^(s / r) / g^(h_M2 / r) mod p)
and hence are verifiable by the same public key (their own key, that is,
not someone else's). This is a "duplicate signature" attack in the
terminology of <http://citeseer.ist.psu.edu/stern02flaws.html>.
Is that a valid attack on the intended security properties of Tahoe?
I think probably not, provided that no-one expects these signatures
to guarantee nonrepudiability.
--
David-Sarah Hopwood ⚥ http://davidsarah.livejournal.com
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