Nearly Gorenstein normal graded rings

Abstract

We investigate nearly Gorenstein property for a normal graded ring R = n 0Rn finitely generated over a field. For that purpose, we investigate KR-1, the inverse of KR (the canonical module of R) and introduce a new invariant b(R) of R. We investigate nearly Gorenstein property of R using a(R) and b(R) and m(R), the initial degree of R. If b(R)<0, (and if R is Q-Gorenstein), then we believe that R is log-terminal -- this is proved if R=2 or R is F-pure (or F-pure type). Then we determine the condition for a 2-dimensional cone singularity over a smooth curve of genus g 3 to be nearly Gorenstein. We observe that ``almost Gorenstein" property and nearly Gorenstein property are drastically different for such rings.