Testability of relations between permutations
Abstract
We initiate the study of property testing problems concerning relations between permutations. In such problems, the input is a tuple of permutations on , and one wishes to determine whether this tuple satisfies a certain system of relations , or is far from every tuple that satisfies . If this computational problem can be solved by querying only a small number of entries of the given permutations, we say that is testable. For example, when and consists of the single relation , this corresponds to testing whether , where and denote composition of permutations. We define a collection of graphs, naturally associated with the system , that encodes all the information relevant to the testability of . We then prove two theorems that provide criteria for testability and non-testability in terms of expansion properties of these graphs. By virtue of a deep connection with group theory, both theorems are applicable to wide classes of systems of relations. In addition, we formulate the well-studied group-theoretic notion of stability in permutations as a special case of the testability notion above, interpret all previous works on stability as testability results, survey previous results on stability from a computational perspective, and describe many directions for future research on stability and testability.
Keywords
Cite
@article{arxiv.2011.05234,
title = {Testability of relations between permutations},
author = {Oren Becker and Alexander Lubotzky and Jonathan Mosheiff},
journal= {arXiv preprint arXiv:2011.05234},
year = {2024}
}
Comments
42 pages; this version was accepted to FOCS 2021