---
res:
  bibo_abstract:
  - "The kinetic Brownian motion on the sphere bundle of a Riemannian manifold $M$\r\nis
    a stochastic process that models a random perturbation of the geodesic flow.\r\nIf
    $M$ is a orientable compact constant negatively curved surface, we show that\r\nin
    the limit of infinitely large perturbation the $L^2$-spectrum of the\r\ninfinitesimal
    generator of a time rescaled version of the process converges to\r\nthe Laplace
    spectrum of the base manifold. In addition, we give explicit error\r\nestimates
    for the convergence to equilibrium. The proofs are based on\r\nnoncommutative
    harmonic analysis of $SL_2(\\mathbb{R})$.@eng"
  bibo_authorlist:
  - foaf_Person:
      foaf_givenName: Martin
      foaf_name: Kolb, Martin
      foaf_surname: Kolb
  - foaf_Person:
      foaf_givenName: Tobias
      foaf_name: Weich, Tobias
      foaf_surname: Weich
      foaf_workInfoHomepage: http://www.librecat.org/personId=49178
    orcid: 0000-0002-9648-6919
  - foaf_Person:
      foaf_givenName: Lasse Lennart
      foaf_name: Wolf, Lasse Lennart
      foaf_surname: Wolf
      foaf_workInfoHomepage: http://www.librecat.org/personId=45027
  dct_date: 2019^xs_gYear
  dct_language: eng
  dct_title: Spectral Asymptotics for Kinetic Brownian Motion on Hyperbolic Surfaces@
...