Fourier--Mukai partners and generalized Kummer structures on generalized Kummer surfaces of order 3

Abstract

A generalized Kummer surface X of order 3 is the minimal resolution of the quotient of an abelian surface A by an order 3 symplectic automorphism. We study a generalization of a problem of Shioda for classical Kummer surfaces, which is to understand how much X is determined by A and conversely. The surface X posses a big and nef divisor LX such that LX2=0 or 2 mod 6. We show that for surfaces with LX2=6k with k≠0,6\,mod\,9, the surface X determines the transcendental lattice T(A) of A and the Hodge structure on T(A). Conversely if A and B are Fourier-Mukai partners (i.e. if the Hodge structures of their transcendental lattices are isomorphic) and Y is the generalized Kummer surface which is the minimal resolution of the quotient of B by an order 3 symplectic automorphism, we obtain that X and Y are isomorphic. These results are also know to hold for surfaces with LX2=2\,mod\,6 from a previous work. When k=0 or 6\,mod\,9, we show that X determines T(A) and its Hodge structure, but the converse does not hold in general.

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