12,905 research outputs found
Displacement interpolations from a Hamiltonian point of view
One of the most well-known results in the theory of optimal transportation is
the equivalence between the convexity of the entropy functional with respect to
the Riemannian Wasserstein metric and the Ricci curvature lower bound of the
underlying Riemannian manifold. There are also generalizations of this result
to the Finsler manifolds and manifolds with a Ricci flow background. In this
paper, we study displacement interpolations from the point of view of
Hamiltonian systems and give a unifying approach to the above mentioned
results.Comment: 46 pages (A discussion on the Finsler case and a new example are
added
On the Jordan-Kinderlehrer-Otto scheme
In this paper, we prove that the Jordan-Kinderlehrer-Otto scheme for a family
of linear parabolic equations on the flat torus converges uniformly in space.Comment: 15 page
A Remark on the Potentials of Optimal Transport Maps
Optimal maps, solutions to the optimal transportation problems, are
completely determined by the corresponding c-convex potential functions. In
this paper, we give simple sufficient conditions for a smooth function to be
c-convex when the cost is given by minimizing a Lagrangian action.Comment: 20 page
Generalized Li-Yau estimates and Huisken's monotonicity formula
We prove a generalization of the Li-Yau estimate for a board class of second
order linear parabolic equations. As a consequence, we obtain a new Cheeger-Yau
inequality and a new Harnack inequality for these equations. We also prove a
Hamilton-Li-Yau estimate, which is a matrix version of the Li-Yau estimate, for
these equations. This results in a generalization of Huisken's monotonicity
formula for a family of evolving hypersurfaces. Finally, we also show that all
these generalizations are sharp in the sense that the inequalities become
equalities for a family of fundamental solutions, which however different from
the Gaussian heat kernels on which the equality was achieved in the classical
case.Comment: 31 page
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