TWO CHARACTERIZATIONS OF PROPER CIRCULAR-ARC GRAPHS.
Abstract
An unoriented, irreflexive graph G is a proper circular-arc graph if there exists a proper family F of circular arcs ('proper' means no arc of F contains another) and a 1-1 correspondence between the vertices of G and the circular arcs in F such that two distinct vertices of G are adjacent if and only if the corresponding circular arcs in F intersect. The family F is called a proper circular-arc model for G. The fundamental problem is: Given a graph G, under what conditions can one construct a proper circular-arc model for G. Two characterizations of proper circular-arc graphs are given, one in terms of a circular property of the adjacency matrix and the other in terms of forbidden subgraphs (like Kuratowski's famous characterization of planar graphs). (Author)
Document Details
- Document Type
- Technical Report
- Publication Date
- Aug 01, 1969
- Accession Number
- AD0699892
Entities
People
- Alan C. Tucker
Organizations
- Stanford University