A few comments on (hyper)k\"ahler geometry

Abstract

In this note, we make two methodical observations. We prove in a simple explicit way that a necessary and sufficient condition for a K\"ahler manifold to be hyperk\"ahler is hi k hj l k l \ =\ C ij, where hi k is a complex metric, is a symplectic matrix and C is a positive constant. The procedure of K\"ahler reduction includes two stages. On the first stage, a K\"ahler manifold of dimension 2n is reduced to a (2n-1) - dimensional manifold, while on the second stage, one arrives at a K\"ahler manifold of dimension 2(n-1). We note that this second stage has the meaning of Hamiltonian reduction. We illustrate the procedure by discussing a simple toy model when R3 × S1 is reduced down to S2. We elucidate also hyperk\"ahler reduction of R7 × S1 down to the Taub-NUT metric.

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