Waring's problem for polynomials in two variables

Abstract

We prove that all polynomials in several variables can be decomposed as the sums of kth powers: P(x1,...,xn) = Q1(x1,...,xn)k+...+ Qs(x1,...,xn)k, provided that elements of the base field are themselves sums of kth powers. We also give bounds for the number of terms s and the degree of the Qik. We then improve these bounds in the case of two variables polynomials of large degree to get a decomposition P(x,y) = Q1(x,y)k+...+ Qs(x,y)k with Qik P + k3 and s that depends on k and ( P).