Zeros of polynomials over finite Witt rings

Abstract

Let Fq denote the finite field of characteristic p and order q. Let Zq denote the unramified extension of the p-adic rational integers Zp with residue field Fq. Given two positive integers m,n, define a box Bm to be a subset of Zqn with qnm elements such that Bm modulo pm is equal to (Zq/pm Zq)n. For a collection of nonconstant polynomials f1,…,fs∈ Zq[x1,…,xn] and positive integers m1,…,ms, define the set of common zeros inside the box Bm to be V=\X∈ Bm:\; fi(X) 0 pmi for all 1≤ i≤ s\. It is an interesting problem to give the sharp estimates for the p-divisibility of |V|. This problem has been partially solved for the three cases: (i) m=m1=·s=ms=1, which is just the Ax-Katz theorem, (ii) m=m1=·s=ms>1, which was solved by Katz, Marshal and Ramage, and (iii) m=1, and m1,…,ms≥ 1, which was recently solved by Cao, Wan and Grynkiewicz. Based on the multi-fold addition and multiplication of the finite Witt rings over Fq, we investigate the remaining unconsidered case of m>1 and m≠ mj for some 1≤ j≤ s, and finally provide a complete answer to this problem.

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