Bound on the multiplicity of almost complete intersections

Abstract

Let R be a polynomial ring over a field of characteristic zero and let I ⊂ R be a graded ideal of height N which is minimally generated by N+1 homogeneous polynomials. If I=(f1,...,fN+1) where fi has degree di and (f1,...,fN) has height N, then the multiplicity of R/I is bounded above by Πi=1N di - \1, Σi=1N (di-1) - (dN+1-1) \.