K-Circular Matroids of Graphs

Abstract

In 30's Hassler Whitney considered and completely solved the problem (WP) of describing the classes of graphs G having the same cycle matroid M(G). A natural analog (WP)' of Whitney's problem (WP) is to describe the classes of graphs G having the same matroid M'(G), where M'(G) is a matroid (on the edge set of G) distinct from M(G). For example, the corresponding problem (WP)'= (WP)θ for the so-called bicircular matroid Mθ (G) of graph G was solved by Coulard, Del Greco and Wagner. We define the so-called k-circular matroid Mk(G) on the edge set of graph G for any non-negative integer k so that M(G) = M0(G) and Mθ (G) = M1(G). It is natural to consider the corresponding analog (WP)k of Whitney's problem (WP) not only for k=0 and k=1 but also for any integer k 2. In this paper we give a characterization of the k-circular matroid Mk(G) by describing the main constituents (circuits, bases, and cocircuits) in terms of graph G and establish some important properties of the k-circular matroid. The results of this paper will be used in our further research on the problem (WP)k. In our next paper we use these results to study a particular problem of (WP)k on graphs uniquely defined by their k-circular matroids.