Permutation and local permutation polynomial of maximum degree
Abstract
Let Fq be the finite field with q elements and Fq[x1,…, xn] the ring of polynomials in n variables over Fq. In this paper we consider permutation polynomials and local permutation polynomials over Fq[x1,…, xn], which define interesting generalizations of permutations over finite fields. We are able to construct permutation polynomials in Fq[x1,…, xn] of maximum degree n(q-1)-1 and local permutation polynomials in Fq[x1,…, xn] of maximum degree n(q-2) when q>3, extending previous results.
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