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Geometric Theory of Optimal Control
June 8, 2023 16:45–18:15, Moscow, online
 


MCP and geodesic dimension on the $l^p$ Heisenberg group

K. Tashiro

Tohoku University
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MP4 130.5 Mb

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Abstract: We study the measure contraction property $MCP(0,N)$ and the geodesic dimension on the Heisenberg group with the $l^p$ sub-Finsler metric. We show that if $p$ is in $(2,\infty]$, then it fails to be $MCP(0,N)$. On the other hand, if $p$ is in $(1,2)$, then it satisfies $MCP(0,N)$ with $N$ strictly greater than $2q+1$ (q being the Hölder conjugate). Furthermore, the geodesic dimension is explicitly given by $\min\{2q+2,5\}$ for all $p$ in $[1,\infty)$. When $p$ is in $(1,\infty)$, our technique is based on the Taylor expansion of the generalized trigonometric function. If $p$ is $1$ or infinity, then its branching geodesics and cut locus are explicitly computed and it yields the conclusion.
This is a joint work with Samuel Borza (SISSA). We put the preprint on the following arXiv link.
https://arxiv.org/abs/2305.16722

Website: https://us06web.zoom.us/j/84704253405?pwd=M1dBejE1Rmp5SlUvYThvZzM3UnlvZz09
 
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