Multidimensional polynomial Szemer\'edi theorem in finite fields for polynomials of distinct degrees

Abstract

We obtain a polynomial upper bound in the finite-field version of the multidimensional polynomial Szemer\'edi theorem for distinct-degree polynomials. That is, if P1, ..., Pt are nonconstant integer polynomials of distinct degrees and v1, ..., vt are nonzero vectors in FpD, we show that each subset of FpD lacking a nontrivial configuration of the form x, x + v1 P1(y), ..., x + vt Pt(y) has at most O(pD-c) elements. In doing so, we apply the notion of Gowers norms along a vector adapted from ergodic theory, which extends the classical concept of Gowers norms on finite abelian groups.