Optimal bounds on surfaces

Abstract

We prove that the first gap of R-complementary thresholds of surfaces is 113. More precisely, the largest R-complementary threshold for surfaces that is strictly less than 1 is 1213. This result has many applications in explicit birational geometry of surfaces and threefolds and allows us to find several other optimal bounds on surfaces. We show that the first gap of global log canonical threshold for surfaces is 113, answering a question of V. Alexeev and W. Liu. We show that the minimal volume of log surfaces with reduced boundary and ample log canonical divisor is 1462, answering a question of J. Koll\'ar. We show that the smallest minimal log discrepancy (mld) of exceptional surfaces is 113. As a special case, we show that the smallest mld of klt Calabi-Yau surfaces is 113, reproving a recent result of L. Esser, B. Totaro, and C. Wang. After a more detailed classification, we classify all exceptional del Pezzo surfaces that are not 111-lt, and show that the smallest mld of exceptional del Pezzo surfaces is 335. We also get better upper bounds of n-complements and Tian's α-invariants for surfaces. Finally, as an analogue of our main theorem in high dimensions, we propose a question associating the gaps of R-complementary thresholds with the gaps of mld's and study some special cases of this question.