Eigenvalue type problem in s(.,.)-fractional Musielak-Sobolev spaces
Abstract
In this paper, first we introduce the s(.,.)-fractional Musielak-Sobolev spaces Ws(x,y)L_x,y(). Next, by means of Ekeland's variational principal, we show that there exists λ*>0 such that any λ∈(0, λ*) is an eigenvalue for the following problem (Pa) \ arrayll( -)s(x,.)a(x,.) u = λ |u|q(x)-2u & in\ , \\ u = 0 & in \ RN , array . where is a bounded open subset of RN with C0,1-regularity and bounded boundary.
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