---
res:
  bibo_abstract:
  - We consider finite-volume approximations of Fokker-Planck equations on bounded
    convex domains in R^d and study the corresponding gradient flow structures. We
    reprove the convergence of the discrete to continuous Fokker-Planck equation via
    the method of Evolutionary Γ-convergence, i.e., we pass to the limit at the level
    of the gradient flow structures, generalising the one-dimensional result obtained
    by Disser and Liero. The proof is of variational nature and relies on a Mosco
    convergence result for functionals in the discrete-to-continuum limit that is
    of independent interest. Our results apply to arbitrary regular meshes, even though
    the associated discrete transport distances may fail to converge to the Wasserstein
    distance in this generality.@eng
  bibo_authorlist:
  - foaf_Person:
      foaf_givenName: Dominik L
      foaf_name: Forkert, Dominik L
      foaf_surname: Forkert
      foaf_workInfoHomepage: http://www.librecat.org/personId=35C79D68-F248-11E8-B48F-1D18A9856A87
  - foaf_Person:
      foaf_givenName: Jan
      foaf_name: Maas, Jan
      foaf_surname: Maas
      foaf_workInfoHomepage: http://www.librecat.org/personId=4C5696CE-F248-11E8-B48F-1D18A9856A87
    orcid: 0000-0002-0845-1338
  - foaf_Person:
      foaf_givenName: Lorenzo
      foaf_name: Portinale, Lorenzo
      foaf_surname: Portinale
      foaf_workInfoHomepage: http://www.librecat.org/personId=30AD2CBC-F248-11E8-B48F-1D18A9856A87
  bibo_doi: 10.48550/arXiv.2008.10962
  dct_date: 2020^xs_gYear
  dct_language: eng
  dct_title: Evolutionary Γ-convergence of entropic gradient flow structures for Fokker-Planck
    equations in multiple dimensions@
...