Akkoyunlu, EbubekirAyazoglu, Rabil2024-10-042024-10-0420190253-41420973-7685https://doi.org/10.1007/s12044-019-0515-7http://hdl.handle.net/20.500.12403/3395In the present paper, we investigate the existence of multiple solutions for the nonhomogeneous fractional p-Kirchhoff equation M(integral integral R2N vertical bar u(x) - u(y)vertical bar(p)/vertical bar x - y vertical bar(N+ps)dxdy + integral V-RN(x)vertical bar u vertical bar p dx) x((-Delta)(p)(s) u + V(x) vertical bar u vertical bar(p-2) u) = f (x, u) in R-N, where (-Delta)(p)(s) is the fractional p-Laplacian operator, 0 < s < 1 < p < infinity with sp < N, M : R-0(+) -> R-0(+) is a nonnegative, continuous and increasing Kirchhoff function, the nonlinearity f : R-N x R -> R is a Caratheodory function that obeys some conditions which will be stated later and V is an element of C(R-N, R+) is a non-negative potential function. We first establish the Bartsch-Pankov-Wang type compact embedding theorem for the fractional Sobolev spaces. Then multiplicity results are obtained by using the variational method, (S+) mapping theory and Krasnoselskii's genus theory.eninfo:eu-repo/semantics/closedAccessKirchhoff equationfractional p-Laplacianvariational methodsKrasnoselskii's genusinfinitely many solutionsArticle129510.1007/s12044-019-0515-72-s2.0-85069704014Q3WOS:000477624700004Q4