On a zero mass Schr\"odinger-Bopp-Podolsky system: ground states, nonexistence results and asymptotic behaviour

Abstract

In this paper, we consider the following zero mass Schr\"odinger-Bopp-Podolsky system \[ cases - u +q2φ u=|u|p-2u, - φ+a22φ=4π u2, cases in R3, \] where a>0 and q 0. We complete the study initiated in [2], which relied on a perturbation argument to establish the existence of weak solutions. Here, in contrast, our approach, based on the Mountain Pass Theorem and the splitting lemma, directly yields a ground state solution for p ∈ (4,6). Moreover, by deriving a Pohozaev identity, we further obtain some nonexistence results for suitable p. Finally, based on the minimax characterization, we also analyse, in the radial case, the asymptotic behaviour of the solutions obtained as a 0, thereby establishing a link with the zero mass Schr\"odinger-Poisson system.