Mathematics > Home > Advances in Pure and Applied Mathematics > Issue 4 (September 2023) > Article
Khaled Ben Ali
Faculty of Sciences Gabes
Tunisia
Khaled Kefi
Faculty of Sciences Tunis El Manar
Tunisia
Haikel Ouerghi
Jendouba university
Tunisia
Published on 8 September 2023 DOI : 10.21494/ISTE.OP.2023.0999
In this paper, we investigate the existence of at least three weak solutions for a class of nonlocal elliptic equations with Navier boundary value conditions. The proof of our result uses the basic theory and critical point theory of variable exponential Lebesgue Sobolev spaces. Moreover a generalization of Corollary 1.1 in [21] is obtained.
In this paper, we investigate the existence of at least three weak solutions for a class of nonlocal elliptic equations with Navier boundary value conditions. The proof of our result uses the basic theory and critical point theory of variable exponential Lebesgue Sobolev spaces. Moreover a generalization of Corollary 1.1 in [21] is obtained.
Leray-Lions type operator critical theorem generalized Sobolev space variable exponent
Leray-Lions type operator critical theorem generalized Sobolev space variable exponent