Philippe Clément, Jan Maas
Published 2010-05-06Version 1
We prove a Trotter product formula for gradient flows in metric spaces. This result is applied to establish convergence in the L^2-Wasserstein metric of the splitting method for some Fokker-Planck equations and porous medium type equations perturbed by a potential.
Comments: 20 pages, submitted for publication
Transformation of $p$-gradient flows to $p'$-gradient flows in metric spaces
Variational convergence of gradient flows and rate-independent evolutions in metric spaces
Kurdyka-Łojasiewicz-Simon inequality for gradient flows in metric spaces
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