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Autori principali: Cho, Gunhee, Jang, Hyun Chul, Kim, Taeik
Natura: Preprint
Pubblicazione: 2025
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Accesso online:https://arxiv.org/abs/2511.04431
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author Cho, Gunhee
Jang, Hyun Chul
Kim, Taeik
author_facet Cho, Gunhee
Jang, Hyun Chul
Kim, Taeik
contents We develop a unified geometric framework for coadapted Brownian couplings on radially isoparametric manifolds (RIM)--spaces whose geodesic spheres have principal curvatures $κ_1(r),\dots,κ_{n-1}(r)$ depending only on the geodesic radius $r$. The mean curvature of such a geodesic sphere is denoted by $A(r) = \mathrm{Tr}(S_r) = \sum_{i=1}^{n-1} κ_i(r)$, where $S_r$ is the shape operator of the sphere of radius $r$. Within the stochastic two--point Itô formalism, we derive an intrinsic drift--window inequality \[ A(r) - \sum_i |κ_i(r)| \;\le\; ρ'(t) \;\le\; A(r) + \sum_i |κ_i(r)|, \] governing the deterministic evolution of the inter--particle distance $ρ_t = d(X_t, Y_t)$ under all coadapted couplings. We prove that this bound is both necessary and sufficient for the existence of a coupling realizing any prescribed distance law $ρ(t)$, thereby extending the constant--curvature classification of Pascu--Popescu (2018) to all RIM. The endpoints of the drift window correspond to the synchronous and reflection couplings, providing geometric realizations of extremal stochastic drifts. Applications include stationary fixed--distance couplings on compact--type manifolds, linear escape laws on asymptotically hyperbolic spaces, and rigidity of rank--one symmetric geometries saturating the endpoint bounds. This establishes a direct correspondence between radial curvature data and stochastic coupling dynamics, linking Riccati comparison geometry with probabilistic coupling theory.
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id arxiv_https___arxiv_org_abs_2511_04431
institution arXiv
publishDate 2025
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spellingShingle Deterministic--Distance Couplings of Brownian Motions on Radially Isoparametric Manifolds
Cho, Gunhee
Jang, Hyun Chul
Kim, Taeik
Probability
Differential Geometry
We develop a unified geometric framework for coadapted Brownian couplings on radially isoparametric manifolds (RIM)--spaces whose geodesic spheres have principal curvatures $κ_1(r),\dots,κ_{n-1}(r)$ depending only on the geodesic radius $r$. The mean curvature of such a geodesic sphere is denoted by $A(r) = \mathrm{Tr}(S_r) = \sum_{i=1}^{n-1} κ_i(r)$, where $S_r$ is the shape operator of the sphere of radius $r$. Within the stochastic two--point Itô formalism, we derive an intrinsic drift--window inequality \[ A(r) - \sum_i |κ_i(r)| \;\le\; ρ'(t) \;\le\; A(r) + \sum_i |κ_i(r)|, \] governing the deterministic evolution of the inter--particle distance $ρ_t = d(X_t, Y_t)$ under all coadapted couplings. We prove that this bound is both necessary and sufficient for the existence of a coupling realizing any prescribed distance law $ρ(t)$, thereby extending the constant--curvature classification of Pascu--Popescu (2018) to all RIM. The endpoints of the drift window correspond to the synchronous and reflection couplings, providing geometric realizations of extremal stochastic drifts. Applications include stationary fixed--distance couplings on compact--type manifolds, linear escape laws on asymptotically hyperbolic spaces, and rigidity of rank--one symmetric geometries saturating the endpoint bounds. This establishes a direct correspondence between radial curvature data and stochastic coupling dynamics, linking Riccati comparison geometry with probabilistic coupling theory.
title Deterministic--Distance Couplings of Brownian Motions on Radially Isoparametric Manifolds
topic Probability
Differential Geometry
url https://arxiv.org/abs/2511.04431