Towards a characterization of toric hyperk\"ahler varieties among symplectic singularities

Abstract

Let (X, ω) be a conical symplectic variety of dimension 2n which has a projective symplectic resolution. Assume that X admits an effective Hamiltonian action of an n-dimensional algebraic torus Tn, compatible with the conical C*-action. A typical example of X is a toric hyperkahler variety Y(A,0). In this article, we prove that this property characterizes Y(A,0) with A unimodular. More precisely, if (X, ω) is such a conical symplectic variety, then there is a Tn-equivariant (complex analytic) isomorphism : (X, ω) (Y(A,0), ωY(A,0)) under which both moment maps are identified. Moreover sends the center 0X of X to the center 0Y(A,0) of Y(A,0).