We investigate pseudodifferential operators on arbitrary locally compact abelian groups. As symbol classes for the Kohn-Nirenberg calculus we introduce a version of Sjoestrand's class. Pseudodifferential operators with such symbols form a Banach algebra that is closed under inversion. Since "hard analysis" techniques are not available on locally compact abelian groups, a new time-frequency approach is used with the emphasis on modulation spaces, Gabor frames, and Banach algebras of matrices. Sjoestrand's original results are thus understood as a phenomenon of abstract harmonic analysis rather than "hard analysis" and are proved in their natural context and generality
We construct an algebra of pseudodifferential operators on each groupoid in a class that generalizes...
This study of classical and modern harmonic analysis extends the classical Wiener's approximation th...
We define pseudo-differential operators on a locally compact, Hausdorff and abelian group G as natur...
We investigate pseudodifferential operators on arbitrary locally compact abelian groups. As...
We investigate pseudodifferential operators on arbitrary locally compact abelian groups. As symbol c...
We introduce a new class of selfadjoint compact pseudodifferential operators, which is analogous to ...
The definition of symbols has been made precise by specifying the regularity needed need $\lambda = ...
We investigate the properties an exotic symbol class of pseudodifferential operators, Sjöstrand’s c...
We investigate the properties an exotic symbol class of pseudodifferential operators, Sjöstrand’s cl...
Pseudodifferential operators are an indispensable tool for the study of partial differential equatio...
The theory of the Fourier algebra lies at the crossroads of several areas of analysis. Its roots are...
Abstract. We use the theory of Gabor frames to prove the boundedness of bilin-ear pseudodierential o...
We present various different approaches to constructing algebras of pseudodifferential operators ada...
The purpose of this paper is to introduce new definitions of Hormander classes for pseudo-differenti...
We investigate the properties an exotic symbol class of pseudodifferential operators, Sjöstrand's cl...
We construct an algebra of pseudodifferential operators on each groupoid in a class that generalizes...
This study of classical and modern harmonic analysis extends the classical Wiener's approximation th...
We define pseudo-differential operators on a locally compact, Hausdorff and abelian group G as natur...
We investigate pseudodifferential operators on arbitrary locally compact abelian groups. As...
We investigate pseudodifferential operators on arbitrary locally compact abelian groups. As symbol c...
We introduce a new class of selfadjoint compact pseudodifferential operators, which is analogous to ...
The definition of symbols has been made precise by specifying the regularity needed need $\lambda = ...
We investigate the properties an exotic symbol class of pseudodifferential operators, Sjöstrand’s c...
We investigate the properties an exotic symbol class of pseudodifferential operators, Sjöstrand’s cl...
Pseudodifferential operators are an indispensable tool for the study of partial differential equatio...
The theory of the Fourier algebra lies at the crossroads of several areas of analysis. Its roots are...
Abstract. We use the theory of Gabor frames to prove the boundedness of bilin-ear pseudodierential o...
We present various different approaches to constructing algebras of pseudodifferential operators ada...
The purpose of this paper is to introduce new definitions of Hormander classes for pseudo-differenti...
We investigate the properties an exotic symbol class of pseudodifferential operators, Sjöstrand's cl...
We construct an algebra of pseudodifferential operators on each groupoid in a class that generalizes...
This study of classical and modern harmonic analysis extends the classical Wiener's approximation th...
We define pseudo-differential operators on a locally compact, Hausdorff and abelian group G as natur...