English

Parameterized and Approximation Complexity of Partial VC Dimension

Data Structures and Algorithms 2019-05-29 v3

Abstract

We introduce the problem Partial VC Dimension that asks, given a hypergraph H=(X,E)H=(X,E) and integers kk and \ell, whether one can select a set CXC\subseteq X of kk vertices of HH such that the set {eC,eE}\{e\cap C, e\in E\} of distinct hyperedge-intersections with CC has size at least \ell. The sets eCe\cap C define equivalence classes over EE. Partial VC Dimension is a generalization of VC Dimension, which corresponds to the case =2k\ell=2^k, and of Distinguishing Transversal, which corresponds to the case =E\ell=|E| (the latter is also known as Test Cover in the dual hypergraph). We also introduce the associated fixed-cardinality maximization problem Max Partial VC Dimension that aims at maximizing the number of equivalence classes induced by a solution set of kk vertices. We study the algorithmic complexity of Partial VC Dimension and Max Partial VC Dimension both on general hypergraphs and on more restricted instances, in particular, neighborhood hypergraphs of graphs.

Keywords

Cite

@article{arxiv.1609.05110,
  title  = {Parameterized and Approximation Complexity of Partial VC Dimension},
  author = {Cristina Bazgan and Florent Foucaud and Florian Sikora},
  journal= {arXiv preprint arXiv:1609.05110},
  year   = {2019}
}

Comments

24 pages, 2 figures

R2 v1 2026-06-22T15:52:11.037Z