Welcome to the resource topic for 2015/169

Title:
Short Schnorr signatures require a hash function with more than just random-prefix resistance

Authors: Daniel R. L. Brown

Neven, Smart and Warinschi (NSW) proved, in the generic group model, that full-length Schnorr signatures require only random-prefix resistant hash functions to resist passive existential forgery. Short Schnorr signatures halve the length of the hash function, and have been conjectured to provide a similar level of security. The NSW result is too loose to provide a meaningful security for short Schnorr signatures, but Neven, Smart and Warinschi conjecture that this is mere artefact of the proof technique, and not an essential deficiency of the short Schnorr signatures. In particular, this amounts to a conjecture that short Schnorr signature are secure under the same set of assumptions, namely random-prefix resistance of the hash function. This report provides a counterexample to the latter conjecture, in other words, a separation result. It finds a hash function that seems to suggest random-prefix resistance does not suffice for short Schnorr signatures. In other words, the loose reduction implicit in the NSW theorem is as tight as possible. Obviously, this result does not preclude the possibility of another proof for short Schnorr signatures, based on different hash function security properties such as preimage resistance.

ePrint: https://eprint.iacr.org/2015/169

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