Identity Testing and Interpolation from High Powers of Polynomials of Large Degree over Finite Fields

Abstract

We consider the problem of identity testing and recovering (that is, interpolating) of a "hidden" monic polynomials f, given an oracle access to f(x)e for x∈ Fq, where Fq is the finite field of q elements and an extension fields access is not permitted. The naive interpolation algorithm needs de+1 queries, where d =\ deg\ f, deg \ g\ and thus requires de<q. For a prime q = p, we design an algorithm that is asymptotically better in certain cases, especially when d is large. The algorithm is based on a result of independent interest in spirit of additive combinatorics. It gives an upper bound on the number of values of a rational function of large degree, evaluated on a short sequence of consecutive integers, that belong to a small subgroup of Fp*.