Positivity of Hochster Theta

Abstract

M. Hochster defines an invariant namely (M,N) associated to two finitely generated module over a hyper-surface ring R=P/f, where P=k\x0,...,xn\ or k[X0,...,xn], for k a field and f is a germ of holomorphic function or a polynomial, having isolated singularity at 0. This invariant can be lifted to the Grothendieck group G0(R)Q and is compatible with the chern character and cycle class map, according to the works of W. Moore, G. Piepmeyer, S. Spiroff, M. Walker. They prove that it is semi-definite when f is a homogeneous polynomial, using Hodge theory on Projective varieties. It is a conjecture that the same holds for general isolated singularity f. We give a proof of this conjecture using Hodge theory of isolated hyper-surface singularities when k=C. We apply this result to give a positivity criteria for intersection multiplicty of proper intersections in the variety of f.