The It\^o exponential on Lie Groups
Abstract
Let be a Lie Group with a left invariant connection . Denote by the Lie algebra of , which is equipped with a connection . 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 and the Lie algebra . This definition characterize directly the martingales in with respect to the left invariant connection . Further, if any geodesic in is send in a 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 into 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 and a bi-invariant connection on . 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 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}
}