A uniqueness positive solutions for strong singular Kirchhoff-type fractional Laplacian problems with Hardy term

Xue Yao

doi:10.1117/12.2679277

14 June 2023 A uniqueness positive solutions for strong singular Kirchhoff-type fractional Laplacian problems with Hardy term

Xue Yao

Author Affiliations +

Proceedings Volume 12725, International Conference on Pure, Applied, and Computational Mathematics (PACM 2023); 127250D (2023) https://doi.org/10.1117/12.2679277
Event: International Conference on Pure, Applied, and Computational Mathematics (PACM 2023), 2023, Suzhou, China

Abstract

A class of the strong singular Kirchhoff-type fractional Laplace problem with Hardy term is considered in a bounded domain Ω ⊂ R^N . A uniqueness of positive result is obtained by variational methods. A novelty is that the Kirchhoff coefficient a,b may vanish at zero, that is, considering the Kirchhoff-type problem in the degenerate cases.

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Xue Yao "A uniqueness positive solutions for strong singular Kirchhoff-type fractional Laplacian problems with Hardy term", Proc. SPIE 12725, International Conference on Pure, Applied, and Computational Mathematics (PACM 2023), 127250D (14 June 2023); https://doi.org/10.1117/12.2679277

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KEYWORDS

Lithium

Chemical elements

Electrical phenomena

Fourier transforms

Mathematics

Scientific research

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