On accumulation points of volumes of log surfaces

Abstract

Let C⊂(0,1] be a set satisfying the descending chain condition. We show that any accumulation point of volumes of log canonical surfaces (X, B) with coefficients in C can be realized as the volume of a log canonical surface with big and nef KX+B and coefficients in C\1\, with at least one coefficient in Acc( C)\1\. As a corollary, if C⊂ Q then all accumulation points of volumes are rational numbers, solving a conjecture of Blache. For the set of standard coefficients C2=\1-1n n∈ N\\1\ we prove that the minimal accumulation point is between 172· 422 and 1422.