Microlocal analysis for Gelfand–Shilov spaces

Rodino, Luigi; Wahlberg, Patrik

doi:10.1007/s10231-023-01324-z

Annali di Matematica

2023

DOI: 10.1007/s10231-023-01324-z

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Microlocal analysis for Gelfand–Shilov spaces

Luigi Rodino

Patrik Wahlberg

Abstract: We introduce an anisotropic global wave front set of Gelfand–Shilov ultradistributions with different indices for regularity and decay at infinity. The concept is defined by the lack of super-exponential decay along power type curves in the phase space of the short-time Fourier transform. This wave front set captures the phase space behaviour of oscillations of power monomial type, a k a chirp signals. A microlocal result is proved with respect to pseudodifferential operators with symbol classes that give rise… Show more

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Cited by 5 publications

References 33 publications

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Construction of the log‐convex minorant of a sequence {Mα}α∈N0d$\lbrace M_\alpha \rbrace _{\alpha \in \mathbb {N}_0^d}$

Boiti,

Jornet,

Oliaro

et al. 2024

Mathematische Nachrichten

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We give a simple construction of the log‐convex minorant of a sequence and consequently extend to the ‐dimensional case the well‐known formula that relates a log‐convex sequence to its associated function , that is, . We show that in the more dimensional anisotropic case the classical log‐convex condition is not sufficient: convexity as a function of more variables is needed (not only coordinate‐wise). We finally obtain some applications to the inclusion of spaces of rapidly decreasing ultradifferentiable functions in the matrix weighted setting.

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Construction of the log‐convex minorant of a sequence {Mα}α∈N0d$\lbrace M_\alpha \rbrace _{\alpha \in \mathbb {N}_0^d}$

Boiti,

Jornet,

Oliaro

et al. 2024

Mathematische Nachrichten

View full text Add to dashboard Cite

show abstract

Propagation of anisotropic Gabor singularities for Schrödinger type equations

Cappiello,

Rodino,

Wahlberg

2024

J. Evol. Equ.

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We show results on propagation of anisotropic Gabor wave front sets for solutions to a class of evolution equations of Schrödinger type. The Hamiltonian is assumed to have a real-valued principal symbol with the anisotropic homogeneity $$a(\lambda x, \lambda ^\sigma \xi ) = \lambda ^{1+\sigma } a(x,\xi )$$ a ( λ x , λ σ ξ ) = λ 1 + σ a ( x , ξ ) for $$\lambda > 0$$ λ > 0 where $$\sigma > 0$$ σ > 0 is a rational anisotropy parameter. We prove that the propagator is continuous on anisotropic Shubin–Sobolev spaces. The main result says that the propagation of the anisotropic Gabor wave front set follows the Hamilton flow of the principal symbol.

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Fourier Characterizations and Non-triviality of Gelfand–Shilov Spaces, with Applications to Toeplitz Operators

Petersson

2023

J Fourier Anal Appl

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We find growth estimates on functions and their Fourier transforms in the one-parameter Gelfand–Shilov spaces $$S_s$$ S s , $$S^\sigma $$ S σ , $$\Sigma _s$$ Σ s and $$\Sigma ^\sigma $$ Σ σ . We obtain characterizations for these spaces and their duals in terms of estimates of short-time Fourier transforms. We determine conditions on the symbols of Toeplitz operators under which the operators are continuous on the one-parameter spaces. Lastly, it is determined that $$\Sigma _s^\sigma $$ Σ s σ is nontrivial if and only if $$s+\sigma > 1$$ s + σ > 1 .

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Microlocal analysis for Gelfand–Shilov spaces

Cited by 5 publications

References 33 publications

Construction of the log‐convex minorant of a sequence {Mα}α∈N0d$\lbrace M_\alpha \rbrace _{\alpha \in \mathbb {N}_0^d}$

Construction of the log‐convex minorant of a sequence {Mα}α∈N0d$\lbrace M_\alpha \rbrace _{\alpha \in \mathbb {N}_0^d}$

Propagation of anisotropic Gabor singularities for Schrödinger type equations

Fourier Characterizations and Non-triviality of Gelfand–Shilov Spaces, with Applications to Toeplitz Operators

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