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ON CERTAIN EXPONENTIAL SUMS AND THE DISTRIBUTION OF DIFFIE–HELLMAN TRIPLES

Published online by Cambridge University Press:  01 June 1999

RAN CANETTI
Affiliation:
IBM T. J. Watson Research Center, Yorktown Heights, New York, NY 10598, USA, [email protected]
JOHN FRIEDLANDER
Affiliation:
Department of Mathematics, University of Toronto, Toronto, Ontario M5S 3G3, Canada, [email protected]
IGOR SHPARLINSKI
Affiliation:
School of MPCE, Macquarie University, Sydney, NSW 2109, Australia, [email protected]
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Abstract

Let g be a primitive root modulo a prime p. It is proved that the triples (gx, gy, gxy), x, y = 1, …, p−1, are uniformly distributed modulo p in the sense of H. Weyl. This result is based on the following upper bound for double exponential sums. Let ε>0 be fixed. Then

formula here

uniformly for any integers a, b, c with gcd(a, b, c, p) = 1. Incomplete sums are estimated as well.

The question is motivated by the assumption, often made in cryptography, that the triples (gx, gy, gxy) cannot be distinguished from totally random triples in feasible computation time. The results imply that this is in any case true for a constant fraction of the most significant bits, and for a constant fraction of the least significant bits.

Type
Notes and Papers
Copyright
The London Mathematical Society 1999

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