TY: JOUR
T1 - Ground state, bound states and bifurcation properties for a Schrodinger-Poisson system with critical exponent
A1 - Chen, Jianqing
A1 - Huang, Lirong
A1 - Rocha, Eugénio
N2 - This article concerns the existence of ground state and bound states, and the study of their bifurcation properties for the Schrödinger-Poisson system(Forumala Presented). Under suitable assumptions on the coefficient h(x), we prove that the ground state must bifurcate from zero, and that another bound state bifurcates from a solution, when µ = µ 1 is the first eigenvalue of ??u + u = µh(x)u in H 1 (R 3 )
UR - https://ria.ua.pt/handle/10773/26145
Y1 - 2019
PB - Texas State University, Department of Mathematics