Regularity, singularities and h-vector of graded algebras

Abstract

Let R be a standard graded algebra over a field. We investigate how the singularities of R affect its h-vector, which is the coefficients of the numerator of its Hilbert series. The most concrete consequences of our work asserts that if R satisfies Serre's condition (Sr) and have reasonable singularities (Du Bois on the punctured spectrum or F-pure), then h0,…, hr≥ 0. Furthermore the multiplicity of R is at least h0+h1+…+hr-1. We also prove that equality in many cases forces R to be Cohen-Macaulay. The main technical tools are sharp bounds on regularity of certain Ext modules, which can be viewed as Kodaira-type vanishing statements for Du Bois and F-singularities. Many corollaries are deduced, for instance that nice singularities of small codimension must be Cohen-Macaulay. Our results build on and extend previous work by de Fernex-Ein, Eisenbud-Goto, Huneke-Smith, Murai-Terai and others.