Toric hyperk\"ahler varieties and Q-factorial terminalizations

Abstract

A toric hyperk\"ahler variety is determined by combinatorial data A and α. Here A is an integer valued matrix and α is a character of an algebraic torus Td. Y(A, α) is a crepant partial resolution of an affine toric hyperk\"ahler variety Y(A,0). However, Y(A, α) is not generally a Q-factorial terminalization of Y(A,0) even if α is generic. In this article, we realize Y(A,0) as another toric hyperk\"ahler variety Y(A, 0) so that Y(A, α) is a Q-factorialization of Y(A, 0) for a generic α. As an application, we give a necessary and sufficient condition for Y(A,0) to have a crepant resolution. Moreover, we construct explicitly the universal Poisson deformation of Y(A,0) in terms of A.

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