Fractional Choquard logarithmic equations with Stein-Weiss potential

Druh výsledku
článek v časopise v databázi Web of Science
Popis
In the present paper, we are concerned with the following fractional $ p $-Laplacian Choquard logarithmic equation. Under mild conditions and combining variational and topological methods, we obtain the existence of axially symmetric solutions both in the exponential subcritical case and in the exponential critical case. We point out that we take advantage of some refined analysis techniques to get over the difficulty carried by the competition of the Choquard logarithmic term and the Stein-Weiss nonlinearity. Moreover, in the exponential critical case, we extend the nonlinearities to more general cases compared with the existing results.
Klíčová slova
Choquard logarithmic equations
exponential growth
Critical exponential growth
Trudinger-Moser inequality