435 research outputs found
A gradient flow approach to the Boltzmann equation
We show that the spatially homogeneous Boltzmann equation evolves as the
gradient flow of the entropy with respect to a suitable geometry on the space
of probability measures which takes the collision process into account. This
gradient flow structure allows to give a new proof for the convergence of Kac's
random walk to the homogeneous Boltzmann equation, exploiting the stability of
gradient flows.Comment: Presentation reworked and streamlined. Variational characterization
of the Boltzmann equation simplified using the action of curve without
referring to the associated distance function. Discussion of the distance
moved to appendix. Additional assumption missing in previous version on
moment bounds of order higher than 2 for Kac walk added in Thm 1.
Curvature bounds for configuration spaces
We show that the configuration space over a manifold M inherits many
curvature properties of the manifold. For instance, we show that a lower Ricci
curvature bound on M implies for the configuration space a lower Ricci
curvature bound in the sense of Lott-Sturm-Villani, the Bochner inequality,
gradient estimates and Wasserstein contraction. Moreover, we show that the heat
flow on the configuration space, or the infinite independent particle process,
can be identified as the gradient flow of the entropy.Comment: 34 page
Discrete Ricci curvature bounds for Bernoulli-Laplace and random transposition models
We calculate a Ricci curvature lower bound for some classical examples of
random walks, namely, a chain on a slice of the n-dimensional discrete cube
(the so-called Bernoulli-Laplace model) and the random transposition shuffle of
the symmetric group of permutations on n letters
The heat equation on manifolds as a gradient flow in the Wasserstein space
Erbar M. The heat equation on manifolds as a gradient flow in the Wasserstein space. Ann. Inst. Henri Poincaré Probab. Stat. 2010;46(1):1-23
- …