Local grand Lebesgue spaces on quasi-metric measure spaces and some applications

Rafeiro, Humberto; Samko, Stefan; Umarkhadzhiev, Salaudin

http://hdl.handle.net/10400.1/18479

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Autores

Rafeiro, Humberto

Samko, Stefan

Umarkhadzhiev, Salaudin

Resumo(s)

We introduce local grand Lebesgue spaces, over a quasi-metric measure space (X, d, mu), where the Lebesgue space is "aggrandized" not everywhere but only at a given closed set F of measure zero. We show that such spaces coincide for different choices of aggrandizers if their Matuszewska-Orlicz indices are positive. Within the framework of such local grand Lebesgue spaces, we study the maximal operator, singular operators with standard kernel, and potential type operators. Finally, we give an application to Dirichlet problem for the Poisson equation, taking F as the boundary of the domain.

Palavras-chave

Grand Lebesgue spaces Maximal function Singular integrals Riesz potential

URI

http://hdl.handle.net/10400.1/18479

Editora

Springer

DOI

10.1007/s11117-022-00915-z

Coleções

FCT2-Artigos (em revistas ou actas indexadas)

Licença CC

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