Hypergraph LSS-ideals and coordinate sections of symmetric tensors

Abstract

Let K be a field, [n]= 1,...,n and H=([n],E) be a hypergraph. For an integer d >= 1 the Lovasz-Saks-Schrijver ideal (LSS-ideal) LHK (d) in K[yij~:~(i,j) ∈ [n] x [d]] is the ideal generated by the polynomials f(d)e= Σj=1d Πi ∈ e yij for edges e of H. In this paper for an algebraically closed field K and a k-uniform hypergraph H=([n],E) we employ a connection between LSS-ideals and coordinate sections of the closure of the set Sn,kd of homogeneous degree k symmetric tensors in n variables of rank <= d to derive results on the irreducibility of its coordinate sections. To this end we provide results on primality and the complete intersection property of LHK (d). We then use the combinatorial concept of positive matching decomposition of a hypergraph H to provide bounds on when LHK(d) turns prime to provide results on the irreducibility of coordinate sections of Sn, kd.