A degree bound for planar functions

Abstract

Using Stickelberger's theorem on Gauss sums, we show that if F is a planar function on a finite field Fq, then for all non-zero functions G : Fq Fq, we have equation* dalg(G F) - dalg(G) n(p-1)2, equation* where q = pn with p a prime and n a positive integer, and dalg(F) is the algebraic degree of F, i.e., the maximum degree of the corresponding system of n lowest-degree interpolating polynomials for F considered as a function on Fpn. This bound implies the (known) classification of planar polynomials over Fp and planar monomials over Fp2. As a new result, using the same degree bound, we complete the classification of planar monomials for all n = 2k with p>5 and k a non-negative integer. Finally, we state a conjecture on the sum of the base-p digits of integers modulo q-1 that implies the complete classification of planar monomials over finite fields of characteristic p>5.

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