Boundedness and K2 for log surfaces

Abstract

Let ε, C be two positive real numbers, and C ⊂ R be a DCC (descending chain condition) set. Let (X, B = Σ bj Bj) denote a projective surface with an R-divisor. Then (1) The class \X\ of surfaces for which there exists a divisor B such that (X,B) is ε-log terminal and -(KX + B) is nef (excluding only those for which at the same time KX 0, B=0, and X has at worst Du Val singularities), is bounded. (2) The set \(KX + B)2\ of squares for the semi log canonical pairs (X, B) with ample KX + B and bj ∈ C, is a DCC set. (3) The class \(X,B)\ of pairs such that (X, B) is semi log canonical, KX + B is ample, (KX + B)2 = C and bj ∈ C, is bounded.

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