Note: Please see pdf for full abstract with equations.
We study the following fractional Kirchhoff-Choquard equation
(a + b∫RN |(−Δ)s/2u|2dx)(−Δ)su + V(x)u = (Iμ ∗ F(u))ƒ(u), in RN,
u ∈ Hs(RN),
where a, b are positive constants, N ≥ 3s, μ ∈ (N − 2s,N), s ∈ (0, 1), Iμ is the Riesz potential. Under certain assumptions on V and ƒ, combing a monotonicity trick and global compactness lemma, we prove that the equation has a ground state solution.
2000 Mathematics Subject Classification. 35R11, 49J35.
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