Polynomial Corners Over finite Fields
Abstract
Recently there has been some progress in understanding the density of a subset of [N]2 that avoids polynomial patterns. Kravitz, Kuca, and Leng showed that if P∈Z[z] satisfies certain conditions, then any set A⊂eq[N]2 does not contain (x,y),(x+P(z),y),(x,y+P(z)), we must have \[ |A|PN2( N)c \] for some small constant c. In this article, we show a similar result in (Fp)2 where we get a better bound on the density of a set A⊂eq (Fp)2 not containing (x,y),(x+P(z),y),(x,y+P(z)) with some conditions on P∈ Fp[z].
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