Moduli of surfaces fibered in log Calabi-Yau pairs
Abstract
We study the moduli spaces of surface pairs (X,D) admitting a log Calabi--Yau fibration (X,D) C. We develop a series of results on stable reduction and apply them to give an explicit description of the boundary of the KSBA compactification. Three interesting cases where our results apply are: (1) divisors on P1 × P1 of bidegree (2n,m); (2) K3 surfaces which map 2:1 to Fn, with X=Fn and D the ramification locus, or (3) elliptic surfaces with either a section or a bisection. The main tools employed are stable quasimaps, the canonical bundle formula, and the minimal model program.
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