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Fourier Integral Operators of Boutet de Monvel Type

Published 10 Jul 2014 in math.FA and math.OA | (1407.2738v2)

Abstract: Given two compact manifolds $X,Y,$ with boundary and a boundary preserving symplectomorphism $\chi:T*Y\setminus0\to T*X\setminus0$, which is one-homogeneous in the fibers and satisfies the transmission condition, we introduce Fourier integral operators of Boutet de Monvel type associated with $\chi$. We study their mapping properties between Sobolev spaces, develop a calculus and prove a Egorov type theorem. We also introduce a notion of ellipticity which implies the Fredholm property. Finally, we show how -- in the spirit of a classical construction by A. Weinstein -- a Fredholm operator of this type can be associated with $\chi$ and a section of the Maslov bundle. If $\dim Y>2$ or the Maslov bundle is trivial, the index is independent of the section and thus an invariant of the symplectomorphism.

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