Wave-front sets related to quasi-analytic Gevrey sequences
Abstract
Quasi-analytic wave-front sets of distributions which correspond to the Gevrey sequence p!s, s∈[1/2,1) are defined and investigated. The propagation of singularities are deduced by considering sequences of Gaussian windowed short-time Fourier transforms of distributions which are modifications of the original distributions by suitable restriction-extension techniques. Basic micro-local properties of the new wave-fronts are thereafter established.
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