English

Homogenisation On Homogeneous Spaces

Probability 2018-03-29 v7

Abstract

Motivated by collapsing of Riemannian manifolds and inhomogeneous scaling of left invariant Riemannian metrics on a real Lie group GG with a sub-group HH, we introduce a family of interpolation equations on GG with a parameter ϵ>0\epsilon>0, interpolating hypo-elliptic diffusions on HH and translates of exponential maps on GG and examine the dynamics as ϵ0\epsilon\to 0. When HH is compact, we use the reductive homogeneous structure of Nomizu to extract a converging family of stochastic processes (converging on the time scale 1ϵ\frac 1 \epsilon), proving the convergence of the stochastic dynamics on the orbit spaces G/HG/H and their parallel translations, providing also an estimate on the rate of the convergence in the Wasserstein distance. Their limits are not necessarily Brownian motions and are classified algebraically by a Peter Weyl's theorem for real Lie groups and geometrically using a weak notion of the naturally reductive property; the classifications allow to conclude the Markov property of the limit process. This can be considered as `taking the adiabatic limit' of the differential operators Lϵ=1ϵk(Ak)2+1ϵA0+Y0{\mathcal L}^\epsilon=\frac 1 {\epsilon} \sum_k (A_k)^2+ \frac 1{\epsilon} A_0+ Y_0 where Y0,AkY_0, A_k are left invariant vector fields and {Ak}\{A_k\} generate the Lie-algebra of HH.

Keywords

Cite

@article{arxiv.1505.06772,
  title  = {Homogenisation On Homogeneous Spaces},
  author = {Xue-Mei Li},
  journal= {arXiv preprint arXiv:1505.06772},
  year   = {2018}
}

Comments

52 pages, to appear: Journal of the Mathematical Society of Japan. With an appendix by D. Rumynin

R2 v1 2026-06-22T09:41:07.168Z