English

Estimating Maximally Probable Constrained Relations by Mathematical Programming

Machine Learning 2014-08-06 v1 Numerical Analysis Optimization and Control Machine Learning

Abstract

Estimating a constrained relation is a fundamental problem in machine learning. Special cases are classification (the problem of estimating a map from a set of to-be-classified elements to a set of labels), clustering (the problem of estimating an equivalence relation on a set) and ranking (the problem of estimating a linear order on a set). We contribute a family of probability measures on the set of all relations between two finite, non-empty sets, which offers a joint abstraction of multi-label classification, correlation clustering and ranking by linear ordering. Estimating (learning) a maximally probable measure, given (a training set of) related and unrelated pairs, is a convex optimization problem. Estimating (inferring) a maximally probable relation, given a measure, is a 01-linear program. It is solved in linear time for maps. It is NP-hard for equivalence relations and linear orders. Practical solutions for all three cases are shown in experiments with real data. Finally, estimating a maximally probable measure and relation jointly is posed as a mixed-integer nonlinear program. This formulation suggests a mathematical programming approach to semi-supervised learning.

Keywords

Cite

@article{arxiv.1408.0838,
  title  = {Estimating Maximally Probable Constrained Relations by Mathematical Programming},
  author = {Lizhen Qu and Bjoern Andres},
  journal= {arXiv preprint arXiv:1408.0838},
  year   = {2014}
}

Comments

16 pages

R2 v1 2026-06-22T05:20:21.495Z