Unique decomposition for a polynomial of low rank

Abstract

Let F be a homogeneous polynomial of degree d in m+1 variables defined over an algebraically closed field of characteristic 0 and suppose that F belongs to the s-th secant variety of the d-uple Veronese embedding of Pm into m+d d-1 but that its minimal decomposition as a sum of d-th powers of linear forms requires more than s addenda. We show that if s≤ d then F can be uniquely written as F=M1d+·s + Mtd+Q, where M1, …, Mt are linear forms with t≤ (d-1)/2, and Q a binary form such that Q=Σi=1q lid-dimi with li's linear forms and mi's forms of degree di such that Σ (di+1)=s-t.