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International youth conference "Geometry & Control"
April 14, 2014 10:50, Moscow, Steklov Mathematical Institute of RAS
 


Heat Kernel Asymptotics at the Cut Locus on Riemannian and Sub-Riemannian Manifolds

Davide Barilari

University Paris Diderot, Paris, France
Video records:
Flash Video 334.5 Mb
Flash Video 2,004.2 Mb
MP4 1,227.5 Mb
Supplementary materials:
Adobe PDF 2.8 Mb
Adobe PDF 54.7 Kb

Number of views:
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Video files:218
Materials:116

Davide Barilari



Abstract: In this talk I will discuss the asymptotics of the heat kernel $p_t(x,y)$ on a Riemannian or sub-Riemannian manifold. We will consider the small time asymptotics, both off-diagonal and at the cut locus, showing how the asymptotic of $p_t(x,y)$ behave depending on whether (and how much) $y$ is conjugate to $x$. Our results are obtained by extending an idea of Molchanov from the Riemannian to the sub-Riemannian case, and some details we get appear to be new even in the Riemannian context.
If time permits I will discuss how these techniques let us to identify the possible asymptotics for the heat kernel at the cut locus for a generic Riemannian manifolds (of dimension less or equal than $5$). This is a consequence of the fact that, among the stable singularities of Lagrangian maps appearing in the classification of Arnold, only two of them can appear as “optimal”, i.e. along minimizing geodesics.

Supplementary materials: slides.pdf (2.8 Mb) , abstract.pdf (54.7 Kb)

Language: English

References
  1. D.Barilari, U. Boscain and R.W. Neel. Small time heat kernel asymptotics at the sub-Riemannian cut locus, Journal of Differential Geometry, 92 (2012), no.3, 373–416.  mathscinet
  2. D. Barilari, J. Jendrej. Small time heat kernel asymptotics at the cut locus on surfaces of revolution, Ann. Inst. Henri Poincaré, Anal. Non Linéaire 31 (2014), pp. 281–295.  mathscinet
  3. D. Barilari, U. Boscain, R.W. Neel and G. Charlot. On the heat diffusion for generic Riemannian and sub-Riemannian structures, arXiv preprint.
 
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