一类有界区域上p(X)-Laplace方程解的存在性

在变指数Lebesgue空间Lp(x)(Ω)、变指数Sobolev空间W~1,p(x)(Ω)、加权变指数Lebesgue空间Lp(x)(Ω;|x~(α(x)))和加权变指数Sobolev空间W~1,p(x)(Ω;|x|~(a(x)))的基本理论体系的基础上利用山路引理得到一类p(x)-Laplace方程非平凡解的存在性.     

对称Sobolev函数到加权函数空间的嵌入

证明Sobolev空间W^(1,p)(R(1,p)(Rⁿ)上对称函数到某类加权Ln)上对称函数到某类加权L^p空间存在紧嵌入定理,进而,作为应用,证明在一定条件下,一类非线性项涉临界Sobolev指标的拟线性椭圆方程具有有限能量解的正解.     

三维Zakharov-Kuznetsov方程解的衰减性

考虑三维Zakharov-Kuznetsov方程的初值问题,证明了该初值问题解的指数衰减性.这个性质与加权Sobolev空间中解的持久性及该问题解的唯一连续性相关.     

加权变指数鞅空间的原子分解及外插理论（英文）

本文讨论加权变指数鞅空间.不仅研究几类加权变指数鞅空间的原子分解理论,而且研究当权函数属于W_(p(x))时的加权变指数鞅空间的外插理论.     

加权奇异拟线性椭圆方程特征值问题

在加权Sobolev空间中,利用Galerkin方法及推广的Brouwer定理,研究一类奇异拟线性椭圆方程高阶特征问题,得到了其非平凡弱解的存在性.     

包含次临界和临界指数以及加权函数的Kirchhoff方程

本文讨论了一类包含次临界和临界Sobolev指数及加权函数的Kirchhoff方程解的存在性.应用Nehari流形和变分方法,在不同情况下,得到了方程至少存在一个非平凡解.     

一类变指数椭圆系统的多重解

利用变指数Sobolev空间理论和临界点理论中的Clark定理,研究一类变指数椭圆系统的边值问题.当非线性项在零点附近p--次线性增长时,得到该系统无穷多个解的存在性.     

θ-型C-Z算子在加权变指数Morrey空间上的有界性

在满足一定的正则性假设条件下,建立了θ-型Calderón-Zygmund算子T_θ在一类变指数Lebesgue空间上的加权有界性.进一步得到了T_θ在加权变指数Herz空间和Herz-Morrey空间上的有界性.另外,还证明了相应的交换子[b,T_θ]在广义加权变指数Morrey空间上是有界的.     

一类具有离散谱的对称微分算子

研究了一类2n-阶线性微分算子在加权Hilbert空间中的谱.通过对加权Sobolev空间H     

变指数加权Herz-Morrey空间上的分数次积分算子交换子的有界性

本文在指数函数的正则性自然假设下,建立了变指数加权Herz-Morrey空间上分数次积分算子及其交换子的有界性.从而得到了变指数加权Herz空间上的一个结果.     

Clifford Valued Weighted Variable Exponent Spaces with an Application to Obstacle Problems

In this paper, we introduce the weighted variable exponent spaces in the context of Clifford algebras. After discussing the properties of these spaces, we obtain the existence of weak solutions for obstacle problems for nondegenerate A-Dirac equations with variable growth in the setting of these spaces. Furthermore, we also obtain the existence and uniqueness of weak solutions to the scalar parts of nondegenerate A-Dirac equations in Dirac Sobolev spaces.     

Poincaré and Sobolev Inequalities for Vector Fields Satisfying Hrmander's Condition in Variable Exponent Sobolev Spaces

In this paper,we will establish Poincare inequalities in variable exponent non-isotropic Sobolev spaces.The crucial part is that we prove the boundedness of the fractional integral operator on variable exponent Lebesgue spaces on spaces of homogeneous type.We obtain the first order Poincare inequalities for vector fields satisfying Hrmander's condition in variable non-isotropic Sobolev spaces.We also set up the higher order Poincare inequalities with variable exponents on stratified Lie groups.Moreover,we get the Sobolev inequalities in variable exponent Sobolev spaces on whole stratified Lie groups.These inequalities are important and basic tools in studying nonlinear subelliptic PDEs with variable exponents such as the p(x)-subLaplacian.Our results are only stated and proved for vector fields satisfying Hrmander's condition,but they also hold for Grushin vector fields as well with obvious modifications.     

Embeddings of variable Haj?asz-Sobolev spaces into Hölder spaces of variable order

Pointwise estimates in variable exponent Sobolev spaces on quasi-metric measure spaces are investigated. Based on such estimates, Sobolev embeddings into Hölder spaces with variable order are obtained. This extends some known results to the variable exponent setting.     

Codazzi and Killing Tensors on a Complete Riemannian Manifold

Mathematical Notes - In this paper, we give two criteria for precompact sets in Bochner–Lebesgue spaces with variable exponent. The results for Bochner–Sobolev spaces with variable...     

The Critical Exponent for Weighted Sobolev Imbeddings

We define the critical exponent of (compact and noncompact) imbeddings of certain special weighted Sobolev spaces into weighted Lebesgue spaces.     

A new class of nonhomogeneous differential operator and applications to anisotropic systems

We introduce a new class of operators that extend both generalized Laplace operators and generalized mean curvature operators. We start the discussion on general anisotropic systems with variable exponents that involve our operators, then we focus on a specific example of such system, we show that it admits a unique weak solution and we complete our work with some comments on other related systems. The newly introduced operators are appropriate for the study conducted in the anisotropic spaces with variable exponents, but at the end of the paper we also provide their versions corresponding to the studies conducted in the anisotropic Sobolev spaces with constant exponents, or in the isotropic variable exponent Sobolev spaces, since, to the best of our knowledge, they represent a novelty even for the classical Sobolev spaces.     

Homogeneous variable exponent Besov and Triebel–Lizorkin spaces

We introduce homogeneous Besov and Triebel–Lizorkin spaces with variable indexes. We show that their study reduces to the study of inhomogeneous variable exponent spaces and homogeneous constant exponent spaces. Corollaries include trace space characterizations and Sobolev embeddings.     

The Dirichlet Energy Integral and Variable Exponent Sobolev Spaces with Zero Boundary Values

We define and study variable exponent Sobolev spaces with zero boundary values. This allows us to prove that the Dirichlet energy integral has a minimizer in the variable exponent case. Our results are based on a Poincaré-type inequality, which we prove under a certain local jump condition for the variable exponent.     

Lipschitz Properties in Variable Exponent Problems via Relative Rearrangement

The author first studies the Lipschitz properties of the monotone and relative rearrangement mappings in variable exponent Lebesgue spaces completing the result given in [9]. This paper is ended by establishing the Lipschitz properties for quasilinear problems with variable exponent when the right-hand side is in some dual spaces of a suitable Sobolev space associated to variable exponent.