Stable Reduction via the Log Canonical Model

Abstract

We formulate a stable reduction conjecture that extends Deligne-Mumford's stable reduction to higher dimensions and provide a simple proof that it holds in large characteristic, assuming two standard conjectures of the Minimal Model Program. As a result, we recover the Hacon-Kov\'acs theorem on the properness of the moduli stack M2,v,k of stable surfaces of volume v defined over k=k, provided that chark>C(v), a constant depending only on v.

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