APPENDIX Overview
–Neural Information Processing Systems
Anequivalence relation on a setA is a binary relation between pairs of elements ofA which satisfies the following three properties: 1. Reflexivity: a a, a A. 2. Symmetry:a b = b a, a,b A. 3. Transitivity: (a b) (b c) = a c. An equivalence relation on a setA imposes a partition into disjoint subsets.
Neural Information Processing Systems
Feb-11-2026, 19:06:33 GMT