In this paper we study a system which is equivalent to a nonlocal version of the well known Brezis Nirenberg problem. The difficulties related with the lack of compactness are here emphasized by the nonlocal nature of the critical nonlinear term. We prove existence and nonexistence results of positive solutions when N=3 and existence of solutions in both the resonance and the nonresonance case for higher dimensions

Generalized Schrödinger-Newton system in dimension $N\ge 3$: critical case

D'AVENIA, Pietro;
2017-01-01

Abstract

In this paper we study a system which is equivalent to a nonlocal version of the well known Brezis Nirenberg problem. The difficulties related with the lack of compactness are here emphasized by the nonlocal nature of the critical nonlinear term. We prove existence and nonexistence results of positive solutions when N=3 and existence of solutions in both the resonance and the nonresonance case for higher dimensions
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11589/73891
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