scholarly journals Smooth pointwise multipliers of modulation spaces

2012 ◽  
Vol 20 (1) ◽  
pp. 317-328 ◽  
Author(s):  
Ghassem Narimani
Keyword(s):  
Multiplication Operator ◽  
Modulation Space ◽  
Modulation Spaces ◽  
Potential Space ◽  
Bessel Potential ◽  
Pointwise Multiplication ◽  
Bessel Potential Space ◽  
Pointwise Multipliers ◽  
Conjugate Exponent

Abstract Let 1 < p, q < ∞ and s, r ∈ ℝ. It is proved that any function in the amalgam space W(Hrp(ℝd), ℓ∞), where p' is the conjugate exponent to p and Hrp′ (ℝd) is the Bessel potential space, defines a bounded pointwise multiplication operator in the modulation space Msp,q(ℝd), whenever r > |s| + d

scholarly journals Positivity in twisted convolution algebra and Fourier modulation spaces

2006 ◽  
Vol 133 (31) ◽  
pp. 75-86
Author(s):  
J. Toft
Keyword(s):  
Subject Classification ◽  
Modulation Space ◽  
Modulation Spaces ◽  
Twisted Convolution ◽  
Convolution Algebra

Let Wp,q be the Fourier modulation space FMp,q and let *? be the twisted convolution. I? ? ? D' such that (a *? ?,?)? 0 for every ? ? C?0, and ? ? such that X(0) ? 0, then we prove that ?? ? Wp,? iff ? ? Wp,?. We also present some extensions to the case when weighted Fourier modulation spaces are used. AMS Mathematics Subject Classification (2000): 47B65, 35A21, 35S05.

scholarly journals Subexponential decay and regularity estimates for eigenfunctions of localization operators

2021 ◽  
Vol 12 (1) ◽  
Author(s):  
Federico Bastianoni ◽  
Nenad Teofanov
Keyword(s):  
Pseudodifferential Operators ◽  
Modulation Space ◽  
Modulation Spaces ◽  
Weight Functions ◽  
Auxiliary Result ◽  
Localization Operators ◽  
Time Frequency ◽  
Continuity Properties ◽  
Regularity Properties ◽  
Time Frequency Localization

AbstractWe consider time-frequency localization operators $$A_a^{\varphi _1,\varphi _2}$$ A a φ 1 , φ 2 with symbols a in the wide weighted modulation space $$ M^\infty _{w}({\mathbb {R}^{2d}})$$ M w ∞ ( R 2 d ) , and windows $$ \varphi _1, \varphi _2 $$ φ 1 , φ 2 in the Gelfand–Shilov space $$\mathcal {S}^{\left( 1\right) }(\mathbb {R}^d)$$ S 1 ( R d ) . If the weights under consideration are of ultra-rapid growth, we prove that the eigenfunctions of $$A_a^{\varphi _1,\varphi _2}$$ A a φ 1 , φ 2 have appropriate subexponential decay in phase space, i.e. that they belong to the Gelfand–Shilov space $$ \mathcal {S}^{(\gamma )} (\mathbb {R^{d}}) $$ S ( γ ) ( R d ) , where the parameter $$\gamma \ge 1 $$ γ ≥ 1 is related to the growth of the considered weight. An important role is played by $$\tau $$ τ -pseudodifferential operators $$Op_{\tau } (\sigma )$$ O p τ ( σ ) . In that direction we show convenient continuity properties of $$Op_{\tau } (\sigma )$$ O p τ ( σ ) when acting on weighted modulation spaces. Furthermore, we prove subexponential decay and regularity properties of the eigenfunctions of $$Op_{\tau } (\sigma )$$ O p τ ( σ ) when the symbol $$\sigma $$ σ belongs to a modulation space with appropriately chosen weight functions. As an auxiliary result we also prove new convolution relations for (quasi-)Banach weighted modulation spaces.

Realizations of homogeneous Besov and Triebel–Lizorkin spaces and an application to pointwise multipliers

2015 ◽  
Vol 13 (02) ◽  
pp. 149-183 ◽  
Author(s):  
Madani Moussai
Keyword(s):  
Besov Spaces ◽  
Pointwise Multiplication ◽  
Pointwise Multipliers

We study the dilation commuting realizations of the homogeneous Besov spaces [Formula: see text] or the homogeneous Triebel–Lizorkin spaces [Formula: see text] in the case p, q > 0, and either s - (n/p) ∉ ℕ0or s - (n/p) ∈ ℕ0and 0 < q ≤ 1 (0 < p ≤ 1 in the [Formula: see text]-case). We present an application to pointwise multiplication if s ≤ n/p.

scholarly journals Modulation spacesMp,qfor0

2006 ◽  
Vol 4 (3) ◽  
pp. 329-341 ◽  
Author(s):  
Masaharu Kobayashi
Keyword(s):  
Modulation Space ◽  
Modulation Spaces ◽  
Tempered Distributions ◽  
Basic Properties

The purpose of this paper is to construct modulation spacesMp,q(Rd)for general0<p,q≦∞, which coincide with the usual modulation spaces when1≦p,q≦∞, and study their basic properties including their completeness. Given anyg∈S(Rd)such that suppĝ⊂  {ξ∣|ξ|≦1}and∑k∈Zdĝ(ξ-αk)≡1, our modulation space consists of all tempered distributionsfsuch that the (quasi)-norm‖f‖M[g]p,q:≔(∫Rd(∫Rd|f*(Mωg)(x)|pdx)qpdω)1qis finite.

Mixed type boundary value problems for Laplace–Beltrami equation on a surface with the Lipschitz boundary

2020 ◽  
Vol 0 (0) ◽  
Author(s):  
Roland Duduchava
Keyword(s):  
Boundary Value Problems ◽  
Mixed Boundary ◽  
Boundary Value ◽  
Beltrami Equation ◽  
Bessel Potential ◽  
Convolution Operators ◽  
Classical Setting ◽  
Type Boundary ◽  
Mellin Convolution ◽  
Bessel Potential Spaces

AbstractThe purpose of the present research is to investigate a general mixed type boundary value problem for the Laplace–Beltrami equation on a surface with the Lipschitz boundary 𝒞 in the non-classical setting when solutions are sought in the Bessel potential spaces \mathbb{H}^{s}_{p}(\mathcal{C}), \frac{1}{p}<s<1+\frac{1}{p}, 1<p<\infty. Fredholm criteria and unique solvability criteria are found. By the localization, the problem is reduced to the investigation of model Dirichlet, Neumann and mixed boundary value problems for the Laplace equation in a planar angular domain \Omega_{\alpha}\subset\mathbb{R}^{2} of magnitude 𝛼. The model mixed BVP is investigated in the earlier paper [R. Duduchava and M. Tsaava, Mixed boundary value problems for the Helmholtz equation in a model 2D angular domain, Georgian Math. J.27 (2020), 2, 211–231], and the model Dirichlet and Neumann boundary value problems are studied in the non-classical setting. The problems are investigated by the potential method and reduction to locally equivalent 2\times 2 systems of Mellin convolution equations with meromorphic kernels on the semi-infinite axes \mathbb{R}^{+} in the Bessel potential spaces. Such equations were recently studied by R. Duduchava [Mellin convolution operators in Bessel potential spaces with admissible meromorphic kernels, Mem. Differ. Equ. Math. Phys.60 (2013), 135–177] and V. Didenko and R. Duduchava [Mellin convolution operators in Bessel potential spaces, J. Math. Anal. Appl.443 (2016), 2, 707–731].

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