Tight Hilbert Polynomial and F-rational local rings

Abstract

Let (R,m) be a Noetherian local ring of prime characteristic p and Q be an m-primary parameter ideal. We give criteria for F-rationality of R using the tight Hilbert function H*Q(n)=(R/(Qn)* and the coefficient e1*(Q) of the tight Hilbert polynomial P*Q(n)=Σi=0d(-1)iei*(Q)n+d-1-id-i. We obtain a lower bound for the tight Hilbert function of Q for equidimensional excellent local rings that generalises a result of Goto and Nakamura. We show that if R=2 , the Hochster-Huneke graph of R is connected and this lower bound is achieved then R is F-rational. Craig Huneke asked if the F-rationality of unmixed local rings may be characterized by the vanishing of e1*(Q). We construct examples to show that without additional conditions, this is not possible. Let R be an excellent, reduced, equidimensional Noetherian local ring and Q be generated by parameter test elements. We find formulas for e1*(Q), e2*(Q), …, ed*(Q) in terms of Hilbert coefficients of Q, lengths of local cohomology modules of R, and the length of the tight closure of the zero submodule of Hdm(R). Using these we prove: R is F-rational e1*(Q)=e1(Q) depth R≥ 2 and e1*(Q)=0.