On a class of singular Hamiltonian Choquard-type elliptic systems with critical exponential growth

Abstract

In this paper, we study the following Hamiltonian Choquard-type elliptic systems involving singular weights eqnarray* aligned \ =1.5pt arrayll - u + V(x)u = (Iμ1 G(v)|x|α)g(v)|x|α \ \ \ & in \ R2,\\[2mm] - v + V(x)v = (Iμ2 F(u)|x|β)f(u)|x|β \ \ \ & in \ R2, array . aligned eqnarray* where μ1,μ2∈(0,2), 0<α ≤ μ12, 0<β ≤ μ22, V(x) is a continuous positive potential, Iμ1 and Iμ2 denote the Riesz potential, indicates the convolution operator, F(s),G(s) are the primitive of f(s),g(s) with f(s),g(s) have exponential growth in R2. Using the linking theorem and variational methods, we establish the existence of solutions to the above problem.