Concentrating nonnegative solutions for double

Abstract

This paper deals with the multiplicity and concentration phenomenon of nonnegative solutions for the following double phase Choquard equation $\begin{matrix} - {div (| \nabla u |}^{p - 2} \nabla u + U_{ε} {(x) | \nabla u |}^{q - 2} \nabla u) + V_{ε} {(x) (| u |}^{p - 2} u + U_{ε} {(x) | u |}^{q - 2} u) \\ = \int_{R^{N}} (\frac{1}{{| x |}^{μ}} * F (u)) f (u) in R^{N}, \end{matrix}$ where $ε$ is a positive parameter, $N \geq 2,$ $1 < p < q < N,$ $q < 2 p,$ $q < p^{*}$ with $p^{*} = \frac{Np}{N - p},$ $0 < μ < p,$ the function $U : R^{N} \to R$ is continuous, $U_{ε} (x) = U (ε x),$ $V : R^{N} \to R$ is a continuous potential and satisfies a local minimum condition, $V_{ε} (x) = V (ε x),$ $f : R \to R$ is a continuous subcritical nonlinearity in the sense of Hardy–Littlewood–Sobolev inequality and F is the primitive of f. Based on the variational methods and topological arguments, the connection between the multiplicity of solutions and the topological structure of the potential at the local minimum points is established.

Details

Title

Concentrating nonnegative solutions for double phase Choquard problems

Author

Zhang, Weiqiang¹; Zuo, Jiabin²

¹ Zhejiang Normal University, Department of Mathematics, Jinhua, China (GRID:grid.453534.0) (ISNI:0000 0001 2219 2654)
² Guangzhou University, School of Mathematics and Information Science, Guangzhou, China (GRID:grid.411863.9) (ISNI:0000 0001 0067 3588)

Pages

Publication year

2026

Publication date

Mar 2026

Publisher

Springer Nature B.V.

e-ISSN

27305422

Source type

Scholarly Journal

Language of publication

English

DOI

https://doi.org/10.1007/s11784-025-01256-6

ProQuest document ID

3279419999

Concentrating nonnegative solutions for double phase Choquard problems

Content area

Abstract

Details

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