Decomposition of homogeneous polynomials with low rank

Abstract

Let F be a homogeneous polynomial of degree d in m+1 variables defined over an algebraically closed field of characteristic zero and suppose that F belongs to the s-th secant varieties of the standard Veronese variety Xm,d⊂ Pm+d d-1 but that its minimal decomposition as a sum of d-th powers of linear forms M1, ..., Mr is F=M1d+... + Mrd with r>s. We show that if s+r≤ 2d+1 then such a decomposition of F can be split in two parts: one of them is made by linear forms that can be written using only two variables, the other part is uniquely determined once one has fixed the first part. We also obtain a uniqueness theorem for the minimal decomposition of F if the rank is at most d and a mild condition is satisfied.