Nonrepetitively 3-colorable subdivisions of graphs with a logarithmic number of subdivisions per edge

Abstract

We show that for every graph G and every graph H obtained by subdividing each edge of G at least O( |V(G)|), H is nonrepetitively 3-colorable. In fact, we show that O( π'(G)) subdivisions per edge are enough, where π'(G) is the nonrepetitive chromatic index of G. This answers a question of Wood and improves a similar result of Pezarski and Zmarz that stated the existence of at least one 3-colorable division with a linear number of subdivision vertices per edge.