Composable Coresets for Constrained Determinant Maximization and Beyond
Abstract
We study algorithms for construction of composable coresets for the task of Determinant Maximization under partition constraint. Given a point set that is partitioned into groups , and integers , where , the goal is to pick points from group such that the overall determinant of the picked points is maximized. Determinant Maximization and its constrained variants have gained a lot of interest for modeling diversity, and have found applications in the context of data summarization. When the cardinality of the selected set is greater than the dimension , we show a peeling algorithm that gives us a composable coreset of size with a provably optimal approximation factor of When , we show a simple coreset construction with optimal size and approximation factor. As a further application of our technique, we get a composable coreset for determinant maximization under the more general laminar matroid constraints, and a composable coreset for unconstrained determinant maximization in a previously unresolved regime. Our results generalize to all strongly Rayleigh distributions and to several other experimental design problems. As an application, we improve the runtime of the practical local-search based algorithm of [Anari-Vuong--COLT'22] for determinantal maximization under partition constraint from to , making it only linear on the number of points .
Cite
@article{arxiv.2211.00289,
title = {Composable Coresets for Constrained Determinant Maximization and Beyond},
author = {Sepideh Mahabadi and Thuy-Duong Vuong},
journal= {arXiv preprint arXiv:2211.00289},
year = {2025}
}