On the maximum diameter of k-colorable graphs

Abstract

Erdos, Pach, Pollack and Tuza [J. Combin. Theory, B 47, (1989), 279-285] conjectured that the diameter of a K2r-free connected graph of order n and minimum degree δ≥ 2 is at most 2(r-1)(3r+2)(2r2-1)· nδ + O(1) for every r 2, if δ is a multiple of (r-1)(3r+2). For every r>1 and δ 2(r-1), we create K2r-free graphs with minimum degree δ and diameter (6r-5)n(2r-1)δ+2r-3+O(1), which are counterexamples to the conjecture for every r>1 and δ>2(r-1)(3r+2)(2r-3). The rest of the paper proves positive results under a stronger hypothesis, k-colorability, instead of being Kk+1-free. We show that the diameter of connected k-colorable graphs with minimum degree ≥ δ and order n is at most (3-1k-1)nδ+O(1), while for k=3, it is at most 57n23δ+O(1).