Classification Fields: Arbitrarily Fine Recursive Hierarchical Clustering From Few Examples

TL;DR

This paper introduces classification fields, a new recursive hierarchical clustering framework that models infinite-depth structures from limited data, with proven convergence and validated experiments.

Contribution

It presents a novel recursive hierarchy generator and learning method that approximates infinite-depth structures from finite observations, with theoretical guarantees and empirical validation.

Findings

Proves exponential convergence of the learned hierarchy to the true generator.

Demonstrates the method's ability to preserve hierarchy and geometry in recursive clustering.

Validates the approach on fractals, CFG hierarchies, and image data.

Abstract

Classical clustering methods usually return either a finite partition of the observed data or a finite dendrogram over it. This finite-sample view is inadequate when the hierarchy of interest is a recursive geometric object with fine-scale refinements that continue beyond the levels directly observed. We introduce classification fields: infinite-depth hierarchical cluster structures on $\mathbb{R}^d$ generated by a local parent-to-child refinement rule. A classification field generator maps each parent centre to an ordered, bounded, and separated tuple of child residuals. Together with a root and a scale factor, this rule recursively generates cluster centres, Voronoi cells, and a metric DAG encoding the hierarchy. Given only a finite prefix of such a hierarchy, we learn a classification field predictor that approximates the generator and can be rolled out to unseen depths. We prove exponential truncation convergence in the completed cell metric and ReLU realizability with width $O(\varepsilon^{-\gamma})$ and depth $\widetilde O(\varepsilon^{-3\gamma/2})$, where $\gamma=\log K/(-\log s)$, up to finite-window aspect-ratio factors. The approximation holds at the level of the induced compact metric structures, measured in the completed cell-metric Hausdorff distance. Experimental validation on matched CFG-generated hierarchies, IFS fractals, and image-induced recursive clustering hierarchies shows that learned predictors preserve ordered child slots, unordered geometry, and hierarchy-level path metrics under recursive rollout. These results support the claim that finite hierarchical observations can reveal local refinement rules capable of generating substantially deeper classification fields.