We study a class of Fourier integral operators on compact manifolds with boundary X and Y , associated with a natural class of symplectomorphisms, namely, those which preserve the boundary. A calculus of Boutet de Monvel’s type can be defined for such Fourier integral operators, and appropriate continuity properties established. One of the key features of this calculus is that the local representations of these operators are given by operator-valued symbols acting on Schwartz functions or temperate distributions. Here we focus on properties of the corresponding local phase functions, which allow to prove this result in a rather straightforward way.

A Class of Fourier Integral Operators on Manifolds with Boundary

BATTISTI, UBERTINO;CORIASCO, Sandro;
2015-01-01

Abstract

We study a class of Fourier integral operators on compact manifolds with boundary X and Y , associated with a natural class of symplectomorphisms, namely, those which preserve the boundary. A calculus of Boutet de Monvel’s type can be defined for such Fourier integral operators, and appropriate continuity properties established. One of the key features of this calculus is that the local representations of these operators are given by operator-valued symbols acting on Schwartz functions or temperate distributions. Here we focus on properties of the corresponding local phase functions, which allow to prove this result in a rather straightforward way.
2015
Pseudo-Differential Operators and Generalized Functions
Basel: Birkhäuser 1964-
Operator Theory, Advances and Applications
245
1
19
arxiv.org/abs/1407.2738
U. Battisti; S. Coriasco; E. Schrohe
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/2318/151603
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