2021-03-18-chewi21a.md

title	abstract	layout	series	publisher	issn	id	month	tex_title	firstpage	lastpage	page	order	cycles	bibtex_author	author	date	address	container-title	volume	genre	issued	pdf	extras
Fast and Smooth Interpolation on Wasserstein Space	We propose a new method for smoothly interpolating probability measures using the geometry of optimal transport. To that end, we reduce this problem to the classical Euclidean setting, allowing us to directly leverage the extensive toolbox of spline interpolation. Unlike previous approaches to measure-valued splines, our interpolated curves (i) have a clear interpretation as governing particle flows, which is natural for applications, and (ii) come with the first approximation guarantees on Wasserstein space. Finally, we demonstrate the broad applicability of our interpolation methodology by fitting surfaces of measures using thin-plate splines.	inproceedings	Proceedings of Machine Learning Research	PMLR	2640-3498	chewi21a	0	Fast and Smooth Interpolation on Wasserstein Space	3061	3069	3061-3069	3061	false	Chewi, Sinho and Clancy, Julien and Le Gouic, Thibaut and Rigollet, Philippe and Stepaniants, George and Stromme, Austin	given family Sinho Chewi given family Julien Clancy given family Thibaut Le Gouic given family Philippe Rigollet given family George Stepaniants given family Austin Stromme	2021-03-18		Proceedings of The 24th International Conference on Artificial Intelligence and Statistics	130	inproceedings	date-parts 2021 3 18	http://proceedings.mlr.press/v130/chewi21a/chewi21a.pdf	label link Supplementary PDF http://proceedings.mlr.press/v130/chewi21a/chewi21a-supp.pdf