On traces of Fourier integral operators on submanifolds
Abstract
Given a smooth embedding i X M of manifolds and a Fourier integral operator = () on M associated with a Lagrangian submanifold ⊂ T*(X× X) \0\, we consider its trace i!() on the submanifold X, i.e. the composition i* i*, where i* and i* are the boundary and coboundary operators, respectively. We establish the conditions under which the trace i!() is also a Fourier integral operator and calculate its amplitude in canonical local coordinates.
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