English

Hidden convexity, optimization, and algorithms on rotation matrices

Optimization and Control 2024-05-01 v2

Abstract

This paper studies hidden convexity properties associated with constrained optimization problems over the set of rotation matrices SO(n)\text{SO}(n). Such problems are nonconvex due to the constraint XSO(n)X \in \text{SO}(n). Nonetheless, we show that certain linear images of SO(n)\text{SO}(n) are convex, opening up the possibility for convex optimization algorithms with provable guarantees for these problems. Our main technical contributions show that any two-dimensional image of SO(n)\text{SO}(n) is convex and that the projection of SO(n)\text{SO}(n) onto its strict upper triangular entries is convex. These results allow us to construct exact convex reformulations for constrained optimization problems over SO(n)\text{SO}(n) with a single constraint or with constraints defined by low-rank matrices. Both of these results are optimal in a formal sense.

Keywords

Cite

@article{arxiv.2304.08596,
  title  = {Hidden convexity, optimization, and algorithms on rotation matrices},
  author = {Akshay Ramachandran and Kevin Shu and Alex L. Wang},
  journal= {arXiv preprint arXiv:2304.08596},
  year   = {2024}
}
R2 v1 2026-06-28T10:08:59.783Z