On the classification of smooth toric surfaces with exactly one exceptional curve

Abstract

We classify all smooth projective toric surfaces S containing exactly one exceptional curve. We show that every such surface S is isomorphic to either F1 or a surface Sr defined by a rational number r ∈ Q Z (r >1). If a:= [ r] then Sr is obtained from the minimal desingularization of the weighted projective plane P(1, 2, 2a+1) by toric blow-ups whose quantity equals the level of the rational number \ r \ ∈ (0,1) in the classical Farey tree. Moreover, we show that if r = b/c with coprime b and c, then Sr is the minimal desingularization of the weighted projective plane P(1, c, b). We apply 2-dimensional regular fans r of toric surfaces Sr for constructing 2-dimensional colored fans c of minimal horospherical 3-folds having a regular SL(2) × Gm-action. The latter are minimal toric 3-folds Vr classified by Z. Guan. We establish a direct combinatorial connection between the 3-dimensional fans cr of 3-folds Vr and the 2-dimensional fans r of surfaces Sr.

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