Normalized Solutions for Schr\"odinger-Bopp-Podolsky Systems with Critical Choquard-Type Nonlinearity on Bounded Domains

Abstract

In this paper, we study normalized solutions for the following critical Schr\"odinger-Bopp-Podolsky system: - u + q(x)φ u = λ u + |u|p-2u + (Iα * |u|3+α)|u|1+αu, in r, -φ + 2φ = q(x)u2, \ \ in r, where r ⊂ R3 is a smooth bounded domain, p ∈ (2, 83), q(x) ∈ C(r) \0\ and λ ∈ R is the Lagrange multiplier associated with the constraint ∫_r |u|2\, d x = b2 for some b > 0. Here α > 0, Iα denotes the Riesz potential, and the domain parameter r reflects the size of r whose precise definition will be given in Section 3. By applying a special minimax principle together with a truncation technique, we prove that there exists b* > 0 such that the system admits multiple normalized solutions whenever b ∈ (0, b*) under Navier boundary conditions.