Ground state solutions of mixed local-nonlolcal equations with Hartree type nonlinearities

Abstract

We study a class of mixed local-nonlocal equations with Hartree-type nonlinearities of the form equationmeqnab - u + (-)s u + u = (Iα * F(u))\,F'(u) in RN, equation where N ≥ 3, s ∈ (0,1), and F ∈ C1(R,R) satisfies Berestycki-Lions type assumptions. The equation combines the classical Laplacian with the fractional Laplacian, while the Hartree-type nonlinearity is given by a nonlocal convolution term involving the Riesz potential Iα, with α ∈ (0,N). We prove the existence of ground state solutions. To this end, we establish regularity properties and derive a Pohozaev-type identity for general weak solutions. Moreover, we obtain symmetry properties of ground state solutions via polarization methods.