Existence of solutions for a system with general Hardy–Sobolev singular criticalities

Arroyo, Ángel; López Soriano, Rafael; Ortega, Alejandro

doi:10.1007/s00526-025-02990-y

s00526-025-02990-y.pdf (532.8Kb)

Identificadores

URI: https://hdl.handle.net/10481/104102

DOI: 10.1007/s00526-025-02990-y

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Editorial

Springer Nature

Fecha

2025-04-07

Referencia bibliográfica

Arroyo, Á., López-Soriano, R. & Ortega, A. Existence of solutions for a system with general Hardy–Sobolev singular criticalities. Calc. Var. 64, 131 (2025). [https://doi.org/10.1007/s00526-025-02990-y]

Patrocinador

CRUE-CSIC agreement with Springer Nature; MICIN/AEI through the Grant PID2021-123151NB-I00; MICIN/AEI through the Grant PID2021-122122NB-I00; IMAG-Maria de Maeztu Excellence Grant CEX2020-001105-M; Research Group FQM-116; Juan de la Cierva Incorporación fellowship (JC2020-046123-I), funded by MCIN/AEI/10.13039/501100011033; European Union Next Generation EU/PRTR

Resumen

In this paper we study a class of Hardy–Sobolev type systems defined in RN and coupled by a singular critical Hardy–Sobolev term. The main novelty of this work is that the orders of the singularities are independent and contained in a wide range. By means of variational techniques, we will prove the existence of positive bound and ground states for such a system. In particular, we find solutions as minimizers or Mountain–Pass critical points of the energy functional on the underlying Nehari manifold.

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