Algebraic tori in the complement of quartic surfaces

Abstract

Let B⊂ P3 be an slc quartic surface. The existence of an embedding Gm3 P3 B implies that B has coregularity zero. In this article, we initiate the classification of coregularity zero slc quartic surfaces B⊂ P3 for which P3 B contains an algebraic torus Gm3. Equivalently, the classification of cluster type pairs (P3,B). Along the way, we give criteria for a log Calabi--Yau pair (X,B) over a toric variety T to be of cluster type.

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