Harmonic Bergman spaces, the Poisson equation and the dual of Hardy-type spaces on certain noncompact manifolds

G. Mauceri, S. Meda, M. Vallarino
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引用次数: 13

Abstract

In this paper we consider a complete connected noncompact Riemannian manifold M with bounded geometry and spectral gap. We realize the dual space Y^h(M) of the Hardy-type space X^h(M), introduced in a previous paper of the authors, as the class of all locally square integrable functions satisfying suitable BMO-like conditions, where the role of the constants is played by the space of global k-quasi-harmonic functions. Furthermore we prove that Y^h(M) is also the dual of the space X^k_fin(M) of finite linear combination of X^k-atoms. As a consequence, if Z is a Banach space and T is a Z-valued linear operator defined on X^k_fin(M), then T extends to a bounded operator from X^k(M) to Z if and only if it is uniformly bounded on X^k-atoms. To obtain these results we prove the global solvability of the generalized Poisson equation L^ku=f with f in L^2_{loc}(M) and we study some properties of generalized Bergman spaces of harmonic functions on geodesic balls
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非紧流形上的调和Bergman空间、Poisson方程和hardy型空间的对偶
本文研究具有有界几何和谱间隙的完全连通非紧黎曼流形M。我们将前人文章中介绍的hardy型空间X^h(M)的对偶空间Y^h(M)实现为满足合适的类bmo条件的所有局部平方可积函数的类,其中常数的作用由全局k-拟调和函数的空间起作用。进一步证明了Y^h(M)也是X^k原子有限线性组合空间X^k_fin(M)的对偶。因此,如果Z是Banach空间,T是定义在X^k_fin(M)上的Z值线性算子,则当且仅当T在X^k原子上一致有界时,T扩展为从X^k(M)到Z的有界算子。为了得到这些结果,我们证明了广义泊松方程L^ku=f与f在L^2_{loc}(M)中的整体可解性,并研究了测地线球上调和函数的广义Bergman空间的一些性质
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来源期刊
CiteScore
2.30
自引率
0.00%
发文量
90
审稿时长
>12 weeks
期刊介绍: The Annals of the Normale Superiore di Pisa, Science Class, publishes papers that contribute to the development of Mathematics both from the theoretical and the applied point of view. Research papers or papers of expository type are considered for publication. The Annals of the Normale Scuola di Pisa - Science Class is published quarterly Soft cover, 17x24
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