Submanifold averaging in riemannian and symplecitc geometry

Abstract

We give a construction to obtain canonically an ``isotropic average'' of given C1-close isotropic submanifolds of a symplectic manifold. To do so we use an improvement of Weinstein's submanifold averaging theorem (obtained in collaboration with H. Karcher) and apply ``Moser's trick''. We also present an application to Hamiltonian group actions.

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