Nonlocal double phase Neumann and Robin problem with variable s(·,·)-order
Abstract
In this paper, we develop some properties of the ax,y(·)-Neumann derivative for the nonlocal s(·,·)-order operator in fractional Musielak-Sobolev spaces with variable s(·,·)-order. Therefore we prove the basic proprieties of the correspondent function spaces. In the second part of this paper, by means of Ekeland's variational principal and direct variational approach, we prove the existence of weak solutions to the following double phase Neumann and Robin problem with variable s(·,·)-order: \array (-)s1(x,·)a1(x,·) u+(-)s2(x,·)a2(x,·) u +a1x(|u|)u+a2x(|u|)u &= λ f(x,u) in\ , \\ Ns1(x,·)a1(x,·)u+Ns2(x,·)a2(x,·)u+β(x)( a1x(|u|)u+a2x(|u|)u ) &= 0 in\ RN , array . where (-)si(x,·)ai(x,·) and Nsi(x,·)ai(x,·) denote the variable si(·,·)-order fractional Laplace operator and the nonlocal normal ai(·,·)-derivative of si(·,·)-order, respectively.
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