Characterization of ultradifferentiable test functions defined by weight matrices in terms of their Fourier Transform
Abstract
We prove that functions with compact support in non-quasianalytic classes 
of Roumieu-type and 
of Beurling-type defined by a weight matrix 
with some mild regularity conditions can be characterized by the decay properties of their Fourier transform. For this we introduce the abstract technique of constructing from multi-index matrices and associated function spaces. We study the behaviour of this construction in detail and characterize its stability. Moreover non-quasianalyticity of the classes mathcal{E}_{\{\mathcal{M}\}}
\mathcal{E}_{(\mathcal{M})}$ is characterized.
of Roumieu-type and of Beurling-type defined by a weight matrix with some mild regularity conditions can be characterized by the decay properties of their Fourier transform. For this we introduce the abstract technique of constructing from multi-index matrices and associated function spaces. We study the behaviour of this construction in detail and characterize its stability. Moreover non-quasianalyticity of the classes mathcal{E}_{\{\mathcal{M}\}}\mathcal{E}_{(\mathcal{M})}$ is characterized.DOI Code:
10.1285/i15900932v36n2p1
Keywords:
Ultradifferentiable functions; non-quasianalyticity; Fourier transform
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