English

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

Computational Complexity 2013-04-03 v1

Abstract

In this paper, we prove tight lower bounds on the smallest degree of a nonzero polynomial in the ideal generated by MODqMOD_q or ¬MODq\neg MOD_q in the polynomial ring Fp[x1,,xn]/(x12=x1,,xn2=xn)F_p[x_1, \ldots, x_n]/(x_1^2 = x_1, \ldots, x_n^2 = x_n), p,qp,q are coprime, which is called \emph{immunity} over FpF_p. The immunity of MODqMOD_q is lower bounded by (n+1)/2\lfloor (n+1)/2 \rfloor, which is achievable when nn is a multiple of 2q2q; the immunity of ¬MODq\neg MOD_q is exactly (n+q1)/q\lfloor (n+q-1)/q \rfloor for every qq and nn. Our result improves the previous bound n2(q1)\lfloor \frac{n}{2(q-1)} \rfloor by Green. We observe how immunity over FpF_p is related to \acc\acc circuit lower bound. For example, if the immunity of ff over FpF_p is lower bounded by n/2o(n)n/2 - o(\sqrt{n}), and 1f=Ω(2n)|1_f| = \Omega(2^n), then ff requires \acc\acc circuit of exponential size to compute.

Cite

@article{arxiv.1304.0713,
  title  = {Represent MOD function by low degree polynomial with unbounded one-sided error},
  author = {Chris Beck and Yuan Li},
  journal= {arXiv preprint arXiv:1304.0713},
  year   = {2013}
}
R2 v1 2026-06-21T23:52:24.282Z