Nondiscreteness of F-thresholds

Abstract

We give examples of two dimensional normal Q-Gorenstein graded domains, where the set of F-thresholds of the maximal ideal is not discrete, thus answering a question by Mustata-Takagi-Watanabe. We also prove that, for a two dimensional standard graded domain (R, m) over a field of characteristic 0, with graded ideal I, if ( mp, Ip) is a reduction mod p of ( m, I) then cIp( mp) ≠ cI∞( m) implies cIp( mp) has p in the denominator.