Roots of Sparse Polynomials over a Finite Field

Abstract

For a t-nomial f(x) = Σi = 1t ci xai ∈ Fq[x], we show that the number of distinct, nonzero roots of f is bounded above by 2 (q-1)1- C, where = 1/(t-1) and C is the size of the largest coset in Fq* on which f vanishes completely. Additionally, we describe a number-theoretic parameter depending only on q and the exponents ai which provides a general and easily-computable upper bound for C. We thus obtain a strict improvement over an earlier bound of Canetti et al.\ which is related to the uniformity of the Diffie-Hellman distribution. Finally, we conjecture that t-nomials over prime fields have only O(t p) roots in Fp* when C = 1.