Solutions for two conjectures on kaleidoscopic edge-colorings

Abstract

For an r-regular graph G, we define an edge-coloring c with colors from \1,2,·s, k\, in such a way that any vertex of G is incident to at least one edge of each color. The multiset-color cm(v) of a vertex v is defined as the ordered tuple (a1,a2,·s ,ak), where ai \ (1≤ i≤ k) denotes the number of edges with color i which are incident with v in G. Then this edge-coloring c is called a k-kaleidoscopic coloring of G if every two distinct vertices in G have different multiset-colors and in this way the graph G is defined as a k-kaleidoscope. In this paper, we determine the integer k for a complete graph Kn to be a k-kaleidoscope, and hence solve a conjecture in [P. Zhang, A Kaleidoscopic View of Graph Colorings, Springer, New York, 2016] that for any integers n and k with n≥ k+3 ≥ 6, the complete graph Kn is a k-kaleidoscope. Then, we construct an r-regular 3-kaleidoscope of order r-12-1 for each integer r≥ 7, where r 3\ (mod\ 4), which solves another conjecture in the same book on the maximum order for r-regular 3-kaleidoscopes.