TY - JOUR
AB - We consider finite-volume approximations of Fokker--Planck equations on bounded convex domains in $\mathbb{R}^d$ and study the corresponding gradient flow structures. We reprove the convergence of the discrete to continuous Fokker--Planck equation via the method of evolutionary $\Gamma$-convergence, i.e., we pass to the limit at the level of the gradient flow structures, generalizing 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.
AU - Forkert, Dominik L
AU - Maas, Jan
AU - Portinale, Lorenzo
ID - 11739
IS - 4
JF - SIAM Journal on Mathematical Analysis
KW - Fokker--Planck equation
KW - gradient flow
KW - evolutionary $\Gamma$-convergence
SN - 0036-1410
TI - Evolutionary $\Gamma$-convergence of entropic gradient flow structures for Fokker-Planck equations in multiple dimensions
VL - 54
ER -