Waring numbers over finite commutative local rings

Abstract

In this paper we study Waring numbers gR(k) for (R, m) a finite commutative local ring with identity and k ∈ N with (k,|R|)=1. We first relate the Waring number gR(k) with the diameter of the Cayley graphs GR(k)=Cay(R,UR(k)) and WR(k)=Cay(R,SR(k)) with UR(k) = \ xk : x∈ R*\ and SR(k)=\xk : x∈ R×\, distinguishing the cases where the graphs are directed or undirected. We show that in both cases (directed or undirected), the graph GR(k) can be obtained by blowing-up the vertices of GFq(k) a number |m| of times, with independence sets the cosets of m, where q is the size of the residue field R/ m. Then, by using the above blowing-up, we reduce the study of the Waring number gR(k) over the local ring R to the computation of the Waring number g(k,q) over the finite residue field R/ m Fq. In this way, using known results for Waring numbers over finite fields, we obtain several explicit results for Waring numbers over finite commutative local rings with identity.

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