An Improved Sufficient Condition for Reconfiguration of List Edge-Colorings in a Tree

摘要

We study the problem of reconfiguring one list edge-coloring of a graph into another list edge-coloring by,changing only one edge color assignment at a time, while at all times maintaining a list edge-coloring, given a list of allowed colors for each edge. Ito, Kamiiiski and De-maine gave a sufficient condition so that any list edge-coloring of a tree can be transformed into any other. In this paper, we give a new sufficient condition which improves the known one; Our sufficient condition is best possible in some sense. The proof is constructive, and yields a polynomial-time algorithm that finds a transformation between two given list edge-colorings of a tree with n vertices via O(n~2) recoloring steps. We remark that the upper bound O(n~2) on the number of recoloring steps is tight, because there is an infinite family of instances on paths that satisfy our sufficient condition and whose reconfiguration requires Ω(n~2) recoloring steps.