Quasi-F∞-split height versus quasi-F-regular height for rational double points and graded rings

Abstract

In this paper, we study a phenomenon concerning quasi-F-singularities: under suitable hypotheses, the finiteness of the quasi-F∞-split height (ht∞) implies quasi-F-regularity, and moreover, ht∞ coincides with the quasi-F-regular height (htreg). We establish this coincidence for two important classes of isolated Gorenstein singularities. First, we explicitly compute ht∞ and htreg for all rational double points, showing that every non-F-pure rational double point satisfies ht∞ = htreg. Second, for localizations of graded non-F-pure normal Gorenstein rings with F-rational punctured spectrum, we again obtain the equality ht∞ = htreg.