Rainbow and monochromatic circuits and cuts in binary matroids

Given a matroid together with a coloring of its ground set, a subset of its elements is called rainbow colored if no two of its elements have the same color. We show that if a binary matroid of rank $r$ is colored with exactly $r$ colors, then $M$ either contains a rainbow colored circuit or a monochromatic cut. As the class of binary matroids is closed under taking duals, this immediately implies that $M$ either contains a rainbow colored cut or a monochromatic circuit as well. As a byproduct, we give a characterization of binary matroids in terms of reductions to partition matroids. Motivated by a conjecture of B\'erczi et al., we also analyze the relation between the covering number of a binary matroid and the maximum number of colors or the maximum size of a color class in any of its rainbow circuit-free colorings. For simple graphic matroids, we show that there exists a rainbow circuit-free coloring that uses each color at most twice only if the graph is $(2,3)$-sparse, that is, it is independent in the $2$-dimensional rigidity matroid. Furthermore, we give a complete characterization of minimally rigid graphs admitting such a coloring.

[1]  G. Laman On graphs and rigidity of plane skeletal structures , 1970 .

[2]  A. Frank Connections in Combinatorial Optimization , 2011 .

[3]  Emeric Gioan,et al.  Combinatorial geometries: Matroids, oriented matroids and applications. Special issue in memory of Michel Las Vergnas , 2015, Eur. J. Comb..

[4]  H. Whitney On the Abstract Properties of Linear Dependence , 1935 .

[5]  Lebrecht Henneberg,et al.  Die graphische Statik der Starren Systeme , 1911 .

[6]  Jiping Liu,et al.  Graphs and digraphs with given girth and connectivity , 1994, Discret. Math..

[7]  D. Lucas,et al.  Weak maps of combinatorial geometries , 1975 .

[8]  Hirokazu Nishimura,et al.  A lost mathematician, Takeo Nakasawa : the forgotten father of matroid theory , 2009 .

[9]  T. Magnanti,et al.  Some Abstract Pivot Algorithms , 1975 .

[10]  Fred Galvin,et al.  The List Chromatic Index of a Bipartite Multigraph , 1995, J. Comb. Theory B.

[11]  Paul Horn,et al.  On Rainbow-Cycle-Forbidding Edge Colorings of Finite Graphs , 2019, Graphs Comb..

[12]  Yutaro Yamaguchi,et al.  List colouring of two matroids through reduction to partition matroids , 2019, ArXiv.

[13]  W. T. Tutte,et al.  A HOMOTOPY THEOREM FOR MATROIDS, II , 2010 .

[14]  Ron Aharoni,et al.  The intersection of a matroid and a simplicial complex , 2006 .

[15]  D. Lucas Properties of rank preserving weak maps , 1974 .

[16]  Kirk Pruhs,et al.  The matroid intersection cover problem , 2021, Oper. Res. Lett..

[17]  C. Nash-Williams Decomposition of Finite Graphs Into Forests , 1964 .