A VARIATIONAL ANALYSIS OF THE THERMAL-EQUILIBRIUM STATE OF CHARGED QUANTUM FLUIDS

The thermal equilibrium state of a charged, isentropic quantum fluid i n a bounded domain Omega is entirely described by the particle density n minimizing the total energy E(n) = integral(Omega)\del root n\(2) integral(Omega)H(n) + 1/2 integral(Omega)nV[n] + integral(Omega)V(e)n where Phi = V[n] + V-e solves Poisson's equation -Delta Phi = n - C s ubject to mixed Dirichlet-Neumann boundary conditions. It is shown tha t for given N > 0 (i. e. for prescribed total number of particles) thi s energy functional admits a unique minimizer in {n is an element of L (1) (Omega); n greater than or equal to 0, integral(Omega) n = N, root n is an element of H-1 (Omega)} Furthermore it is proven that n is an element of C-loc(1,lambda)(Omega)boolean AND L(infinity)(Omega) for a ll lambda is an element of (0, 1) and n > 0 in Omega.