Decomposability of multivariable polynomials

Abstract

Let K be an algebrically closed field and let n≥ 1. If P∈ K[X]=K[X1,…,Xn], P≠ 0, we denote by I(P) the support of P, which is the finite subset of Nn such that P=Σi∈ I(P)aiXi with ai∈ K*. (If i=(i1,…,in) then Xi:=X1i1·s Xnin.) We determine all finite, nonempty sets I Nn such that every P∈ K[X] with I(P)=I is decomposable. We also consider the problem of finding all I Nn such that every P∈ K[X] with I(P)=I is irreducible. We do not solve this problem, which is very unlikely to have a simple answer. We show however that the answer depends on the characteristic of K and we determine the nature of this dependence.