Skip to content

Latest commit

 

History

History
26 lines (17 loc) · 1.71 KB

README.md

File metadata and controls

26 lines (17 loc) · 1.71 KB

proximal-projection-algorithm

Numerical examples for the paper "Proximal Projection Method for Stable Linearly Constrained Optimization".

License: MIT Docs

Proximal Projection Algorithm

Howard Heaton

Abstract

Many applications using large datasets require efficient methods for minimizing a proximable convex function subject to satisfying a set of linear constraints within a specified tolerance. For this task, we present a proximal projection (PP) algorithm, which is an instance of Douglas-Rachford splitting that directly uses projections onto the set of constraints. Formal guarantees are presented to prove convergence of PP estimates to optimizers. Unlike many methods that obtain feasibility asymptotically, each PP iterate is feasible. Numerically, we show PP either matches or outperforms alternatives (e.g. linearized Bregman, primal dual hybrid gradient, proximal augmented Lagrangian, proximal gradient) on problems in basis pursuit, stable matrix completion, stable principal component pursuit, and the computation of earth mover’s distances.

Publication

Proximal Projection Method for Stable Linearly Constrained Optimization arXiv Link

@article{heaton2024proximal,
         title={{Proximal Projection Method for Stable Linearly Constrained Optimization}},
         author={Heaton, Howard},
         journal={{arXiv preprint}},
         year={2024}
}

See the documentation site for more details about code.