Rainbow Stars and Rota's Basis Conjecture for Graphic Matroids

Abstract: Let $G$ be a connected multigraph with $n$ vertices, and suppose $G$ has been edge-colored with $n-1$ colors so that each color class induces a spanning tree. Rota's Basis Conjecture for graphic matroids posits that one can find $n-1$ mutually edge-disjoint rainbow spanning trees. In a paper, Maezawa and Yazawa have shown that the conjecture holds if one assumes that the color classes induce spanning stars. We delve further into the star case to explore some extreme subcases including: all stars with different centers, the same center, or one of two centers. In addition, we identify the cases in which a graph composed of monochromatic stars can be decomposed into rainbow stars. We also show that the statement is false if one replaces stars' withpaths'.