216 research outputs found
Hamilton-Jacobi Equations and Distance Functions on Riemannian Manifolds
The paper is concerned with the properties of the distance function from a
closed subset of a Riemannian manifold, with particular attention to the set of
singularities
A Flow Tangent to the Ricci Flow via Heat Kernels and Mass Transport
We present a new relation between the short time behavior of the heat flow,
the geometry of optimal transport and the Ricci flow. We also show how this
relation can be used to define an evolution of metrics on non-smooth metric
measure spaces with Ricci curvature bounded from below
Some remarks on Huisken's monotonicity formula for mean curvature flow
We discuss a monotone quantity related to Huisken's monotonicity formula and
some technical consequences for mean curvature flow.Comment: in "Singularities in nonlinear evolution phenomena and applications",
157-169, CRM Series, 9, Ed. Sc. Norm. Pisa, 200
Evolution of the Weyl Tensor under the Ricci Flow
We compute the evolution equation of the Weyl tensor under the Ricci flow of
a Riemannian manifold and we discuss some consequences for the classification
of locally conformally flat Ricci solitons
Motion by curvature of networks with two triple junctions
We consider the evolution by curvature of a general embedded network with two
triple junctions. We classify the possible singularities and we discuss the
long time existence of the evolution
Locally conformally flat ancient Ricci flows
We show that any locally conformally flat ancient solution to the Ricci flow
must be rotationally symmetric. As a by-product, we prove that any locally
conformally flat Ricci soliton is a gradient soliton in the shrinking and
steady cases as well as in the expanding case, provided the soliton has
nonnegative curvature.Comment: Final version, to appear on Anal. PD
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