Elementary Symmetric Polynomials for Optimal Experimental Design

Zelda E. Mariet; Suvrit Sra

2017 NIPS NeurIPS 2017

Elementary Symmetric Polynomials for Optimal Experimental Design

Abstract

We revisit the classical problem of optimal experimental design (OED) under a new mathematical model grounded in a geometric motivation. Specifically, we introduce models based on elementary symmetric polynomials; these polynomials capture "partial volumes" and offer a graded interpolation between the widely used A-optimal and D-optimal design models, obtaining each of them as special cases. We analyze properties of our models, and derive both greedy and convex-relaxation algorithms for computing the associated designs. Our analysis establishes approximation guarantees on these algorithms, while our empirical results substantiate our claims and demonstrate a curious phenomenon concerning our greedy algorithm. Finally, as a byproduct, we obtain new results on the theory of elementary symmetric polynomials that may be of independent interest.

🌉 Interdisciplinary Bridge — Machine Learning and Mathematics & Optimization

🧭 Keyword Pioneer — d-optimal design

🐝 Cross-Pollinator — Artificial Intelligence, Computer Science, Computer Vision, Data Science & Analytics, Deep Learning, Healthcare & Medicine, Interdisciplinary, Knowledge & Reasoning, Machine Learning, Mathematics & Optimization, Natural Language Processing, Reinforcement Learning, Robotics, Security & Privacy, Speech & Audio

Authors

Zelda E. Mariet , Suvrit Sra

Topics

Machine Learning > Core Methods > Regression Mathematics & Optimization > Mathematics > Algebra Mathematics & Optimization > Optimization > Combinatorial Optimization Mathematics & Optimization > Optimization > Continuous Optimization

Keywords

convex optimization convex relaxation optimal experimental design greedy algorithm approximation guarantee a-optimal design d-optimal design elementary symmetric polynomial

Download PDF

Related papers

High-Order Attention Models for Visual Question Answering 2017

Breaking the Nonsmooth Barrier: A Scalable Parallel Method for Composite Optimization 2017

Premise Selection for Theorem Proving by Deep Graph Embedding 2017

Neural Program Meta-Induction 2017

Safe and Nested Subgame Solving for Imperfect-Information Games 2017