On the fractional Musielak-Sobolev spaces in Rd: Embedding results & applications

Abstract

This paper deals with new continuous and compact embedding theorems for the fractional Musielak-Sobolev spaces in Rd. As an application, using the variational methods, we obtain the existence of nontrivial weak solution for the following Schr\"odinger equation (-)gx,ys u+V(x)g(x,x,u)=b(x) up(x)-2u,\ for all\ x∈ Rd, where (-)gx,ys is the fractional Museilak gx,y-Laplacian, V is a potential function, b∈ Lδ'(x)(Rd), and p,δ∈ C(Rd,(1,+∞)) L∞(Rd). We would like to mention that the theory of the fractional Musielak-Sobolev spaces is in a developing state and there are few papers in this topic, see M1,M8,M9. Note that, all these latter works dealt with bounded case and there are no results devoted for the fractional Musielak-Sobolev spaces in Rd. Since the embedding results are crucial in applying variational methods, this work will provide a bridge between the fractional Mueislak-Sobolev theory and PDE's.