MMODELYST
Papers/Gaussian mixture models in Hilbert spaces via kernel methods
PAP

Gaussian mixture models in Hilbert spaces via kernel methods

May 7, 2026

arXiv
Abstract

Modern datasets across many disciplines increasingly consist of time-evolving, potentially infinite-dimensional random objects, such as dynamic functional data, which are naturally modeled in Hilbert spaces. In these settings, characterizing probability measures, for example, through densities, can be ill-defined or technically challenging. Motivated by clustering applications, we propose a Gaussian mixture framework for Hilbert-space-valued data based on kernel mean embeddings and develop efficient optimization algorithms for estimation. We establish theoretical guarantees showing that the proposed algorithm is well defined and that the model yields a dense class of approximations in infinite-dimensional spaces. We evaluate the framework through extensive experiments on diverse structures and data geometries, including $L^2$-functional data and random graphs in Laplacian spaces arising in modern medical applications.

Select text to highlight · click a highlight to remove · saved in this browser only
Authors
Daniel López-Montero, Antonio Álvarez-López, Marcos Matabuena
Your notes (browser-local)
saved
arXiv:2605.05996