What question did this study set out to answer?

The aim is to investigate the existence of infinitely many sign-changing solutions for a specific differential equation problem.

March 21, 2026

Construction of infinitely many sign-changing solutions for the Hartree type Brezis–Nirenberg problem

Key Points

The aim is to investigate the existence of infinitely many sign-changing solutions for a specific differential equation problem.
Studied a differential equation involving a bounded domain and integral terms.
Proved the non-degeneracy of the single bubbling solution.
Utilized finite dimensional reduction to establish results for ball-shaped domains.
Demonstrated the existence of infinitely many sign-changing bubbling solutions.
Showed that the energy of these solutions can be made arbitrarily large.

Abstract

In this paper, we study the following problem: −Δu=∫Ω|u(z)|2|y−z|4dzu+λu, in Ω, u=0, on ∂Ω, where Ω is a bounded domain in R6. If λ 0 is small, the single bubbling solution of the above problem has been constructed in Yang et al. J. Differ. Equations 344, 260–324 (2023). We first prove that this solution is non-degenerate. Then, using this result and the finite dimensional reduction argument, we prove that if Ω is a ball, the above problem has infinitely many sign-changing bubbling solutions, whose energy can be arbitrarily large.

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