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Original Articles

Representation and approximation of pseudodifferential operators by sums of Gabor multipliers

Pages 385-401 | Received 14 Aug 2009, Accepted 25 May 2010, Published online: 12 Jan 2011
 

Abstract

We investigate a new representation of general operators by means of sums of shifted Gabor multipliers. These representations arise by studying the matrix of an operator with respect to a Gabor frame. Each shifted Gabor multiplier corresponds to a side-diagonal of this matrix. This representation is especially useful for operators whose associated matrix possesses some off-diagonal decay. In this case one can completely characterize the symbol class of the operator by the size of the symbols of the Gabor multipliers. As an application we derive approximation theorems for pseudodifferential operators in the Sjöstrand class.

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Acknowledgements

K.G. was supported by the Marie-Curie Excellence Grant MEXT-CT 2004-517154 and in part by the FWF grant SISE S10602.

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