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On Non-Abelian Symplectic Cutting

arXiv:1202.3077 · doi:10.1007/s00031-012-9202-9

Abstract

We discuss symplectic cutting for Hamiltonian actions of non-Abelian compact groups. By using a degeneration based on the Vinberg monoid we give, in good cases, a global quotient description of a surgery construction introduced by Woodward and Meinrenken, and show it can be interpreted in algebro-geometric terms. A key ingredient is the `universal cut' of the cotangent bundle of the group itself, which is identified with a moduli space of framed bundles on chains of projective lines recently introduced by the authors.

Various edits made, to appear in Transformation Groups. 28 pages, 8 figures