Judith M. Arms scite author profile

Abstract. The zero set of a momentum mapping is shown to have a singularity at each point with symmetry. The zero set is diffeomorphic to the product of a manifold and the zero set of a homogeneous quadratic function. The proof uses the Kuranishi theory of deformations. Among the applications, it is shown that the set of all solutions of the Yang-Mills equations on a Lorentz manifold has a singularity at any solution with symmetry, in the sense of a pure gauge symmetry. Similarly, the set of solutions of Einstein's equations has a singularity at any solution that has spacelike Killing fields, provided the spacetime has a compact Cauchy surface.

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Geometric and algebraic reduction for singular momentum maps

Arms

Gotay

Jennings

1990

Advances in Mathematics

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Judith M. Arms

A Universal Reduction Procedure for Hamiltonian Group Actions

Symmetry and bifurcations of momentum mappings

Geometric and algebraic reduction for singular momentum maps

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