Your search keyword '"Goodwin, Ariel"' showing total 4 results

1. Recognizing weighted means in geodesic spaces

Author

Goodwin, Ariel, Lewis, Adrian S., Lopez-Acedo, Genaro, and Nicolae, Adriana

Subjects

Mathematics - Optimization and Control, Mathematics - Numerical Analysis, 90C48, 57Z25, 65K10, 49M29, G.1.6

Abstract

Geodesic metric spaces support a variety of averaging constructions for given finite sets. Computing such averages has generated extensive interest in diverse disciplines. Here we consider the inverse problem of recognizing computationally whether or not a given point is such an average, exactly or approximately. In nonpositively curved spaces, several averaging notions, including the usual weighted barycenter, produce the same "mean set". In such spaces, at points where the tangent cone is a Euclidean space, the recognition problem reduces to Euclidean projection onto a polytope. Hadamard manifolds comprise one example. Another consists of CAT(0) cubical complexes, at relative-interior points: the recognition problem is harder for general points, but we present an efficient semidefinite-programming-based algorithm.

Published

2024

2. Convex optimization on CAT(0) cubical complexes

Author

Goodwin, Ariel, Lewis, Adrian S., Lopez-Acedo, Genaro, and Nicolae, Adriana

Subjects

Mathematics - Optimization and Control, 90C48, 52A41, 57Z25, 65K05, F.2.1

Abstract

We consider geodesically convex optimization problems involving distances to a finite set of points $A$ in a CAT(0) cubical complex. Examples include the minimum enclosing ball problem, the weighted mean and median problems, and the feasibility and projection problems for intersecting balls with centers in $A$. We propose a decomposition approach relying on standard Euclidean cutting plane algorithms. The cutting planes are readily derivable from efficient algorithms for computing geodesics in the complex.

Published

2024

3. Maximum Entropy on the Mean and the Cram\'er Rate Function in Statistical Estimation and Inverse Problems: Properties, Models, and Algorithms

Author

Vaisbourd, Yakov, Choksi, Rustum, Goodwin, Ariel, Hoheisel, Tim, and Schönlieb, Carola-Bibiane

Subjects

Mathematics - Statistics Theory, Computer Science - Information Theory, Mathematics - Optimization and Control, Mathematics - Probability

Abstract

We explore a method of statistical estimation called Maximum Entropy on the Mean (MEM) which is based on an information-driven criterion that quantifies the compliance of a given point with a reference prior probability measure. At the core of this approach lies the MEM function which is a partial minimization of the Kullback-Leibler divergence over a linear constraint. In many cases, it is known that this function admits a simpler representation (known as the Cram\'er rate function). Via the connection to exponential families of probability distributions, we study general conditions under which this representation holds. We then address how the associated MEM estimator gives rise to a wide class of MEM-based regularized linear models for solving inverse problems. Finally, we propose an algorithmic framework to solve these problems efficiently based on the Bregman proximal gradient method, alongside proximal operators for commonly used reference distributions. The article is complemented by a software package for experimentation and exploration of the MEM approach in applications.

Published

2022

4. From perspective maps to epigraphical projections

Author

Friedlander, Michael P., Goodwin, Ariel, and Hoheisel, Tim

Subjects

Mathematics - Optimization and Control, Mathematics - Numerical Analysis, 52A4, 65K10, 90C25, 90C46

Abstract

The projection onto the epigraph or a level set of a closed proper convex function can be achieved by finding a root of a scalar equation that involves the proximal operator as a function of the proximal parameter. This paper develops the variational analysis of this scalar equation. The approach is based on a study of the variational-analytic properties of general convex optimization problems that are (partial) infimal projections of the the sum of the function in question and the perspective map of a convex kernel. When the kernel is the Euclidean norm squared, the solution map corresponds to the proximal map, and thus the variational properties derived for the general case apply to the proximal case. Properties of the value function and the corresponding solution map -- including local Lipschitz continuity, directional differentiability, and semismoothness -- are derived. An SC$^1$ optimization framework for computing epigraphical and level-set projections is thus established. Numerical experiments on 1-norm projection illustrate the effectiveness of the approach as compared with specialized algorithms

Published

2021