ON INVARIANT MEASURES FOR CLASSICAL DYNAMICAL SYSTEMS WITH INFINITE-DIMENSIONAL PHASE SPACE

@inproceedings{Arsenev1984ONIM,
  title={ON INVARIANT MEASURES FOR CLASSICAL DYNAMICAL SYSTEMS WITH INFINITE-DIMENSIONAL PHASE SPACE},
  author={Aleksei Alekseevich Arsen'ev},
  year={1984}
}
The Kubo-Martin-Schwinger state is constructed for a Hamiltonian dynamical system whose phase space is Hilbert space, with Hamiltonian representable as the sum of two terms: the square of the norm and a function that is smooth on the completion of the original space in the nuclear norm.Bibliography: 5 titles.