We study the existence of positive solutions for a class of systems which strongly couple a quasilinear Schröodinger equation driven by a weighted N-Laplace operator and without the mass term, and a higher-order fractional Poisson equation. Since the system is set in RN$\mathbb {R}<^>N$, the limiting case for the Sobolev embedding, we consider nonlinearities with exponential growth. Existence is proved relying on the study of a corresponding Choquard equation in which the Riesz kernel is a logarithm, hence sign-changing and unbounded from above and below. This is in turn solved by means of a variational approximating procedure for an auxiliary Choquard equation, where the logarithm is uniformly approximated by polynomial kernels. Our results are new even in the planar case N=2$N=2$.
Schrödinger–Poisson systems with zero mass in the Sobolev limiting case
Romani G.
2024-01-01
Abstract
We study the existence of positive solutions for a class of systems which strongly couple a quasilinear Schröodinger equation driven by a weighted N-Laplace operator and without the mass term, and a higher-order fractional Poisson equation. Since the system is set in RN$\mathbb {R}<^>N$, the limiting case for the Sobolev embedding, we consider nonlinearities with exponential growth. Existence is proved relying on the study of a corresponding Choquard equation in which the Riesz kernel is a logarithm, hence sign-changing and unbounded from above and below. This is in turn solved by means of a variational approximating procedure for an auxiliary Choquard equation, where the logarithm is uniformly approximated by polynomial kernels. Our results are new even in the planar case N=2$N=2$.
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