On asymptotic behavior for a class of diffusion equations involving the fractional $$\wp (\cdot )$$ ℘ ( · ) -Laplacian as $$\wp (\cdot )$$ ℘ ( · ) goes to $$\infty $$ ∞

In this manuscript, we will study the asymptotic behavior for a class of nonlocal diffusion equations associated with the weighted fractional \(\wp (\cdot )\)-Laplacian operator involving constant/variable exponent, with \(\wp ^{-}:=\min _{(x,y) \in {\overline{\Omega }}\times {\overline{\Omega }}} \wp (x,y)\geqslant \max \left\{ 2N/(N+2s),1\right\} \) and \(s\in (0,1).\) In the case of constant exponents, under some appropriate conditions, we will study the existence of solutions and asymptotic behavior of solutions by employing the subdifferential approach and we will study the problem when \(\wp \) goes to \(\infty \). Already, for case the weighted fractional \(\wp (\cdot )\)-Laplacian operator, we will also study the asymptotic behavior of the problem solution when \(\wp (\cdot )\) goes to \(\infty \), in the whole or in a subset of the domain (the problem involving the fractional \(\wp (\cdot )\)-Laplacian presents a discontinuous exponent). To obtain the results of the asymptotic behavior in both problems it will be via Mosco convergence.