Condensers with infinitely many touching Borel plates and minimum energy problems

摘要

Defining a condenser in a locally compact space as a locally finite, countable collection of Borel sets A_i, i 2 I, with the sign s_i = ±1 prescribed such that A_i ∩ A_j =? whenever s_is_j = -1, we consider a minimum energy problem with an external field over infinite-dimensional vector measures (μ~i)_(i∈I) , where μ~i is a suitably normalized positive Radon measure carried by A_i and such that μ~i ≤ ξ~i for all i ∈ I_0, I_0 ? I and constraints ξ~i, i ∈ I_0, being given. If I_0 = ?, the problem reduces to the (unconstrained) Gauss variational problem, which is in general unsolvable even for a condenser of two closed, oppositely signed plates in R~3 and the Coulomb kernel. Nevertheless, we provide sufficient conditions for the existence of solutions to the stated problem in its full generality, establish the vague compactness of the solutions, analyze their uniqueness, describe their weighted potentials, and single out their characteristic properties. The strong and the vague convergence of minimizing nets to the minimizers is studied. The phenomena of non-existence and nonuniqueness of solutions to the problem are illustrated by examples. The results obtained are new even for the classical kernels on R~n, n ≥ 2, and closed A_i, i ∈ I, which is important for applications.