scholarly journals Sobolev space, Besov space and Triebel-Lizorkin space on the Laguerre hypergroup

2012 ◽  
Vol 2012 (1) ◽  
Author(s):  
Jizheng Huang
Keyword(s):  
Sobolev Space ◽  
Besov Space ◽  
Lizorkin Space ◽  
Laguerre Hypergroup

scholarly journals The sobolev embeddings are usually sharp

2005 ◽  
Vol 2005 (4) ◽  
pp. 437-448 ◽  
Author(s):  
A. Fraysse ◽  
S. Jaffard
Keyword(s):  
Sobolev Space ◽  
Besov Space ◽  
Hölder Regularity ◽  
Sobolev Embeddings ◽  
Residual Sets ◽  
Holder Regularity

Letx0∈ℝd; we study the Hölder regularity atx0of a generic function of the Sobolev spaceLp,s(ℝd)and of the Besov spaceBps,q(ℝd)fors−d/p>0. The setting for genericity is supplied here by HP-residual sets.

scholarly journals Interpolation methods to estimate eigenvalue distribution of some integral operators

2004 ◽  
Vol 2004 (9) ◽  
pp. 479-485
Author(s):  
E. M. El-Shobaky ◽  
N. Abdel-Mottaleb ◽  
A. Fathi ◽  
M. Faragallah
Keyword(s):  
Besov Space ◽  
Asymptotic Distribution ◽  
Function Space ◽  
Integral Operators ◽  
Eigenvalue Distribution ◽  
Factorization Theorem ◽  
Lizorkin Space ◽  
Interpolation Methods ◽  
Distribution Of Eigenvalues

We study the asymptotic distribution of eigenvalues of integral operatorsTkdefined by kernelskwhich belong to Triebel-Lizorkin function spaceFpuσ(F  qvτ)by using the factorization theorem and the Weyl numbersxn. We use the relation between Triebel-Lizorkin spaceFpuσ(Ω)and Besov spaceBpqτ(Ω)and the interpolation methods to get an estimation for the distribution of eigenvalues in Lizorkin spacesFpuσ(F  qvτ).

Finite time blow-up of complex solutions of the conserved Kuramoto–Sivashinsky equation in ℝd and in the torus 𝕋d, d ⩾ 1

2019 ◽  
Vol 149 (5) ◽  
pp. 1175-1188
Author(s):  
Léo Agélas
Keyword(s):  
Sobolev Space ◽  
Initial Data ◽  
Besov Space ◽  
Finite Time ◽  
Blow Up ◽  
Global Solutions ◽  
Large Initial Data ◽  
Complex Solutions ◽  
Complex Valued ◽  
Sivashinsky Equation

AbstractWe consider complex-valued solutions of the conserved Kuramoto–Sivashinsky equation which describes the coarsening of an unstable solid surface that conserves mass and that is parity symmetric. This equation arises in different aspects of surface growth. Up to now, the problem of existence and smoothness of global solutions of such equations remained open in ℝd and in the torus 𝕋d, d ⩾ 1. In this paper, we answer partially to this question. We prove the finite time blow-up of complex-valued solutions associated with a class of large initial data. More precisely, we show that there is complex-valued initial data that exists in every Besov space (and hence in every Lebesgue and Sobolev space), such that after a finite time, the complex-valued solution is in no Besov space (and hence in no Lebesgue or Sobolev space).

scholarly journals Some new Besov and Triebel-Lizorkin spaces associated with para-accretive functions on spaces of homogeneous type

2006 ◽  
Vol 80 (2) ◽  
pp. 229-262 ◽  
Author(s):  
Dongguo Deng ◽  
Dachun Yang
Keyword(s):  
Besov Space ◽  
Type Inequality ◽  
Space Of Homogeneous Type ◽  
Embedding Theorems ◽  
Homogeneous Type ◽  
Spaces Of Homogeneous Type ◽  
Lizorkin Space ◽  
Hardy Type ◽  
Riesz Operators ◽  
Type Spaces

AbstractLet (X, ρ, μ)d, θ be a space of homogeneous type with d < 0 and θ ∈ (0, 1], b be a para-accretive function, ε ∈ (0, θ], ∣s∣ > ∈ and a0 ∈ (0, 1) be some constant depending on d, ∈ and s. The authors introduce the Besov space bBspq (X) with a0 > p ≧ ∞, and the Triebel-Lizorkin space bFspq (X) with a0 > p > ∞ and a0 > q ≧∞ by first establishing a Plancherel-Pôlya-type inequality. Moreover, the authors establish the frame and the Littlewood-Paley function characterizations of these spaces. Furthermore, the authors introduce the new Besov space b−1 Bs (X) and the Triebel-Lizorkin space b−1 Fspq (X). The relations among these spaces and the known Hardy-type spaces are presented. As applications, the authors also establish some real interpolation theorems, embedding theorems, T b theorems, and the lifting property by introducing some new Riesz operators of these spaces.

Addendum: Local Elliptic Regularity for the Dirichlet Fractional Laplacian

2017 ◽  
Vol 17 (4) ◽  
pp. 837-839 ◽  
Author(s):  
Umberto Biccari ◽  
Mahamadi Warma ◽  
Enrique Zuazua
Keyword(s):  
Dirichlet Problem ◽  
Sobolev Space ◽  
Besov Space ◽  
Weak Solutions ◽  
Fractional Laplacian ◽  
Local Regularity ◽  
Elliptic Regularity ◽  
Open Set ◽  
Regularity Of Weak Solutions

AbstractIn [1], for {1<p<\infty}, we proved the {W^{2s,p}_{\mathrm{loc}}} local elliptic regularity of weak solutions to the Dirichlet problem associated with the fractional Laplacian {(-\Delta)^{s}} on an arbitrary bounded open set of {\mathbb{R}^{N}}. Here we make a more precise and rigorous statement. In fact, for {1<p<2} and {s\neq\frac{1}{2}}, local regularity does not hold in the Sobolev space {W^{2s,p}_{\mathrm{loc}}}, but rather in the larger Besov space {(B^{2s}_{p,2})_{\mathrm{loc}}}.

Image Decomposition and Inpainting Based on Besov and Hilbert-Sobolev Space

2014 ◽  
Vol 599-601 ◽  
pp. 1857-1862
Author(s):  
Zhu Qin Liu
Keyword(s):  
Sobolev Space ◽  
Besov Space ◽  
Signal To Noise Ratio ◽  
Image Decomposition ◽  
Experimental Results ◽  
Signal To Noise ◽  
Visual Effect ◽  
Structure Information ◽  
Basic Characteristics ◽  
Application Requirements

An image is decomposed into structure and texture adopt Meyer model , In order to more effectively express the characteristics of the image ,a schem is proposed that structure and texture described use Besov space and Hilbert-Sobolev space respectively,and different inpainting methods is adopt for structure and texture .Experimental results show that the algorithm calculated simple, easy to implement ,Smoothness and structure information, such as the basic characteristics of the image portrayed to meet the application requirements and inpaint results in low signal-to-noise ratio, the visual effect is superior to the similar method.

scholarly journals Geometric analysis on Cantor sets and trees

2017 ◽  
Vol 2017 (725) ◽  
Author(s):  
Anders Björn ◽  
Jana Björn ◽  
James T. Gill ◽  
Nageswari Shanmugalingam
Keyword(s):  
Sobolev Space ◽  
Besov Space ◽  
Besov Spaces ◽  
Rooted Tree ◽  
Geometric Analysis ◽  
Cantor Sets ◽  
Rooted Trees ◽  
First Order ◽  
Sharp Estimates ◽  
Type Sets

AbstractUsing uniformization, Cantor type sets can be regarded as boundaries of rooted trees. In this setting, we show that the trace of a first-order Sobolev space on the boundary of a regular rooted tree is exactly a Besov space with an explicit smoothness exponent. Further, we study quasisymmetries between the boundaries of two trees, and show that they have rough quasiisometric extensions to the trees. Conversely, we show that every rough quasiisometry between two trees extends as a quasisymmetry between their boundaries. In both directions we give sharp estimates for the involved constants. We use this to obtain quasisymmetric invariance of certain Besov spaces of functions on Cantor type sets.

scholarly journals Finite-dimensional boundary uniform stabilization of the Boussinesq system in Besov spaces by critical use of Carleman estimate-based inverse theory

2021 ◽  
Vol 0 (0) ◽  
Author(s):  
Irena Lasiecka ◽  
Buddhika Priyasad ◽  
Roberto Triggiani
Keyword(s):  
Besov Space ◽  
Internal Control ◽  
Initial Conditions ◽  
Fluid Velocity ◽  
Critical Role ◽  
Boussinesq System ◽  
Heat Equations ◽  
Fluid Equation ◽  
Low Regularity ◽  
Finite Dimensional

Abstract We consider the 𝑑-dimensional Boussinesq system defined on a sufficiently smooth bounded domain and subject to a pair { v , u } \{v,\boldsymbol{u}\} of controls localized on { Γ ~ , ω } \{\widetilde{\Gamma},\omega\} . Here, 𝑣 is a scalar Dirichlet boundary control for the thermal equation, acting on an arbitrarily small connected portion Γ ~ \widetilde{\Gamma} of the boundary Γ = ∂ ⁡ Ω \Gamma=\partial\Omega . Instead, 𝒖 is a 𝑑-dimensional internal control for the fluid equation acting on an arbitrarily small collar 𝜔 supported by Γ ~ \widetilde{\Gamma} . The initial conditions for both fluid and heat equations are taken of low regularity. We then seek to uniformly stabilize such Boussinesq system in the vicinity of an unstable equilibrium pair, in the critical setting of correspondingly low regularity spaces, by means of an explicitly constructed, finite-dimensional feedback control pair { v , u } \{v,\boldsymbol{u}\} localized on { Γ ~ , ω } \{\widetilde{\Gamma},\omega\} . In addition, they will be minimal in number and of reduced dimension; more precisely, 𝒖 will be of dimension ( d - 1 ) (d-1) , to include necessarily its 𝑑-th component, and 𝑣 will be of dimension 1. The resulting space of well-posedness and stabilization is a suitable, tight Besov space for the fluid velocity component (close to L 3 ⁢ ( Ω ) \boldsymbol{L}^{3}(\Omega) for d = 3 d=3 ) and a corresponding Besov space for the thermal component, q > d q>d . Unique continuation inverse theorems for suitably over-determined adjoint static problems play a critical role in the constructive solution. Their proof rests on Carleman-type estimates, a topic pioneered by M. V. Klibanov since the early 80s.

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