TY - JOUR
AB - We consider discrete porous medium equations of the form ∂tρt=Δϕ(ρt), where Δ is the generator of a reversible continuous time Markov chain on a finite set χ, and ϕ is an increasing function. We show that these equations arise as gradient flows of certain entropy functionals with respect to suitable non-local transportation metrics. This may be seen as a discrete analogue of the Wasserstein gradient flow structure for porous medium equations in ℝn discovered by Otto. We present a one-dimensional counterexample to geodesic convexity and discuss Gromov-Hausdorff convergence to the Wasserstein metric.
AU - Erbar, Matthias
AU - Jan Maas
ID - 2132
IS - 4
JF - Discrete and Continuous Dynamical Systems- Series A
TI - Gradient flow structures for discrete porous medium equations
VL - 34
ER -