Represent MOD function by low degree polynomial with unbounded one-sided error

Abstract

In this paper, we prove tight lower bounds on the smallest degree of a nonzero polynomial in the ideal generated by MODq or MODq in the polynomial ring Fp[x1, …, xn]/(x12 = x1, …, xn2 = xn), p,q are coprime, which is called immunity over Fp. The immunity of MODq is lower bounded by (n+1)/2 , which is achievable when n is a multiple of 2q; the immunity of MODq is exactly (n+q-1)/q for every q and n. Our result improves the previous bound n2(q-1) by Green. We observe how immunity over Fp is related to circuit lower bound. For example, if the immunity of f over Fp is lower bounded by n/2 - o(n), and |1f| = (2n), then f requires circuit of exponential size to compute.