The AL$\ell_0$CORE Tensor Decomposition for Sparse Count Data
Abstract
This paper introduces ALCORE, a new form of probabilistic non-negative tensor decomposition. ALCORE is a Tucker decomposition where the number of non-zero elements (i.e., the -norm) of the core tensor is constrained to a preset value much smaller than the size of the core. While the user dictates the total budget , the locations and values of the non-zero elements are latent variables and allocated across the core tensor during inference. ALCORE -- i.e., cated -nstrained -- thus enjoys both the computational tractability of CP decomposition and the qualitatively appealing latent structure of Tucker. In a suite of real-data experiments, we demonstrate that ALCORE typically requires only tiny fractions (e.g.,~1%) of the full core to achieve the same results as full Tucker decomposition at only a correspondingly tiny fraction of the cost.
Cite
@article{arxiv.2403.06153,
title = {The AL$\ell_0$CORE Tensor Decomposition for Sparse Count Data},
author = {John Hood and Aaron Schein},
journal= {arXiv preprint arXiv:2403.06153},
year = {2024}
}