An edge-colored connected graph G is properly connected if between every pair of distinct vertices, there exists a path such that no two adjacent edges have the same color. Fujita (2019) introduced the optimal proper connection number pcopt(G) for a monochromatic connected graph G, to make a connected graph properly connected efficiently. More precisely, pcopt (G) is the smallest integer p+q when one converts a given monochromatic graph G into a properly connected graph by recoloring p edges with q colors. In this paper, we show that pcopt (G) has an upper bound in terms of the independence number α(G). Namely, we prove that for a connected graph G, pcopt (G) [Formula presented]. Moreover, for the case α(G)≤3, we improve the upper bound to 4, which is tight.
Supported by JSPS KAKENHI, Japan (No. 19K03603).Park's work was supported by Basic Science Research Program through the National Research Foundation of Korea (NRF) funded by the Ministry of Science, ICT and Future Planning, South Korea (NRF-2018R1C1B6003577).
