English

The It\^o exponential on Lie Groups

Probability 2013-05-27 v2

Abstract

Let GG be a Lie Group with a left invariant connection G\nabla^{G}. Denote by \g\g the Lie algebra of GG, which is equipped with a connection \g\nabla^{\g}. Our main is to introduce the concept of the It\^o exponential and the It\^o logarithm, which take in account the geometry of the Lie group GG and the Lie algebra \g\g. This definition characterize directly the martingales in GG with respect to the left invariant connection G\nabla^{G}. Further, if any \g\nabla^{\g} geodesic in \g\g is send in a G\nabla^{G} geodesic we can show that the It\^o exponential and the It\^o logarithm are the same that the stochastic exponential and the stochastic logarithm due to M. Hakim-Dowek and D. L\'epingle in [10]. Consequently, we have a Campbell-Hausdorf formula. From this formula we show that the set of affine maps from (M,G)(M,\nabla^{G}) into (G,G)(G,\nabla^{G}) is a subgroup of the Loop group. As in general, the Lie algebra is considered as smooth manifold with a flat connection, we show a Campbell-Hausdorf formula for a flat connection on \g\g and a bi-invariant connection on GG. To this main we introduce the definition of the null quadratic variation property. To end, we use the Campbell-Hausdorff formula to show that a product of harmonic maps with value in GG is a harmonic map.

Keywords

Cite

@article{arxiv.1106.5637,
  title  = {The It\^o exponential on Lie Groups},
  author = {Simão N. Stelmastchuk},
  journal= {arXiv preprint arXiv:1106.5637},
  year   = {2013}
}
R2 v1 2026-06-21T18:28:35.745Z