Limits of log canonical thresholds

Abstract

Let Tn denote the set of log canonical thresholds of pairs (X,Y), with X a nonsingular variety of dimension n, and Y a nonempty closed subscheme of X. Using non-standard methods, we show that every limit of a decreasing sequence in Tn lies in Tn-1, proving in this setting a conjecture of Koll\'ar. We also show that Tn is a closed subset in the set of real numbers; in particular, every limit of log canonical thresholds on smooth varieties of fixed dimension is a rational number. As a consequence of this property, we see that in order to check Shokurov's ACC Conjecture for all Tn, it is enough to show that 1 is not a point of accumulation from below of any Tn. In a different direction, we interpret the ACC Conjecture as a semi-continuity property for log canonical thresholds of formal power series.