Optimization on the symplectic group
Abstract
We regard the real symplectic group as a constraint submanifold of the real matrices endowed with the Euclidean (Frobenius) metric, respectively as a submanifold of the general linear group endowed with the (left) invariant metric. For a cost function that defines an optimization problem on the real symplectic group we give a necessary and sufficient condition for critical points and we apply this condition to the particular case of a least square cost function. In order to characterize the critical points we give a formula for the Hessian of a cost function defined on the real symplectic group, with respect to both considered metrics. For a generalized Brockett cost function we present a necessary condition and a sufficient condition for local minimum. We construct a retraction map that allows us to detail the steepest descent and embedded Newton algorithms for solving an optimization problem on the real symplectic group.
Cite
@article{arxiv.1811.07345,
title = {Optimization on the symplectic group},
author = {Petre Birtea and Ioan Casu and Dan Comanescu},
journal= {arXiv preprint arXiv:1811.07345},
year = {2020}
}