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Main Authors: Liu, Jian-Guo, Pego, Robert L.
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2411.05606
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author Liu, Jian-Guo
Pego, Robert L.
author_facet Liu, Jian-Guo
Pego, Robert L.
contents We study all the ways that a given convex body in $d$ dimensions can break into countably many pieces that move away from each other rigidly at constant velocity, with no rotation or shearing. The initial velocity field is locally constant, but may be continuous and/or fail to be integrable. For any choice of mass-velocity pairs for the pieces, such a motion can be generated by the gradient of a convex potential that is affine on each piece. We classify such potentials in terms of a countable version of a theorem of Alexandrov for convex polytopes, and prove a stability theorem. For bounded velocities, there is a bijection between the mass-velocity data and optimal transport flows (Wasserstein geodesics) that are locally incompressible. Given any rigidly breaking velocity field that is the gradient of a continuous potential, the convexity of the potential is established under any of several conditions, such as the velocity field being continuous, the potential being semi-convex, the mass measure generated by a convexified transport potential being absolutely continuous, or there being a finite number of pieces. Also we describe a number of curious and paradoxical examples having fractal structure.
format Preprint
id arxiv_https___arxiv_org_abs_2411_05606
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Rigidly breaking potential flows and a countable Alexandrov theorem for polytopes
Liu, Jian-Guo
Pego, Robert L.
Analysis of PDEs
Optimization and Control
Primary 49Q22, 52B99, Secondary 35F21, 58E10, 76B99
We study all the ways that a given convex body in $d$ dimensions can break into countably many pieces that move away from each other rigidly at constant velocity, with no rotation or shearing. The initial velocity field is locally constant, but may be continuous and/or fail to be integrable. For any choice of mass-velocity pairs for the pieces, such a motion can be generated by the gradient of a convex potential that is affine on each piece. We classify such potentials in terms of a countable version of a theorem of Alexandrov for convex polytopes, and prove a stability theorem. For bounded velocities, there is a bijection between the mass-velocity data and optimal transport flows (Wasserstein geodesics) that are locally incompressible. Given any rigidly breaking velocity field that is the gradient of a continuous potential, the convexity of the potential is established under any of several conditions, such as the velocity field being continuous, the potential being semi-convex, the mass measure generated by a convexified transport potential being absolutely continuous, or there being a finite number of pieces. Also we describe a number of curious and paradoxical examples having fractal structure.
title Rigidly breaking potential flows and a countable Alexandrov theorem for polytopes
topic Analysis of PDEs
Optimization and Control
Primary 49Q22, 52B99, Secondary 35F21, 58E10, 76B99
url https://arxiv.org/abs/2411.05606