A nullstellensatz for sequences over Fp

Abstract

Let p be a prime and let A=(a1,...,al) be a sequence of nonzero elements in Fp. In this paper, we study the set of all 0-1 solutions to the equation a1 x1 + ... + al xl = 0. We prove that whenever l >= p, this set actually characterizes A up to a nonzero multiplicative constant, which is no longer true for l < p. The critical case l=p is of particular interest. In this context, we prove that whenever l=p and A is nonconstant, the above equation has at least p-1 minimal 0-1 solutions, thus refining a theorem of Olson. The subcritical case l=p-1 is studied in detail also. Our approach is algebraic in nature and relies on the Combinatorial Nullstellensatz as well as on a Vosper type theorem.