Stationary Solutions of the Vlasov-Poisson System with Diffusive Boundary Conditions

The stationary solutions of the Vlasov-Poisson system for a plasma are studied with general diffusive boundary conditions. The distribution function , which depends on the local energy and angular momentum, is determined uniquely under certain integrability and decay assumptions on the diffusive kernels and the particle injection intensities. The resulting nonlinear Poisson equation is then solved for the electric potential . We study the existence and uniqueness of its solutions in one and higher dimensions under a variety of settings.