Uniqueness of Dirichlet forms associated with systems of infinitely many Brownian balls in ℝ^d

Dirichlet forms associated with systems of infinitely many Brownian balls in ℝ^d are studied. Introducing a linear operator L₀ defined on a space of smooth local functions, we show the uniqueness of Dirichlet forms associated with self adjoint Markovian extensions of L₀. We also discuss the ergodicity of the reversible process associated with the Dirichlet form.