Existence of flips and minimal models for 3-folds in char p

Abstract

We will prove the following results for 3-fold pairs (X,B) over an algebraically closed field k of characteristic p>5: log flips exist for -factorial dlt pairs (X,B); log minimal models exist for projective klt pairs (X,B) with pseudo-effective KX+B; the log canonical ring R(KX+B) is finitely generated for projective klt pairs (X,B) when KX+B is a big -divisor; semi-ampleness holds for a nef and big -divisor D if D-(KX+B) is nef and big and (X,B) is projective klt; -factorial dlt models exist for lc pairs (X,B); terminal models exist for klt pairs (X,B); ACC holds for lc thresholds; etc.