A note on the Alon-Saks-Seymour problem

Abstract

Let f(k) be the maximum possible chromatic number of a graph whose edge set can be partitioned into at most k complete bipartite graphs. Alon, Saks, and Seymour conjectured that f(k)=k+1 for all k. While the conjecture was verified for k ≤ 9 by Gao et al., it was disproved by Huang and Sudakov, and further Balodis et al. proved that f(k) ≥ 2Ω(( k)2). In this note, we give a simple proof of the recursive upper bound f(k+1) ≤ f(k)+f( k/4 ). Consequently, f(k) ≤ 2(2 (4k))2/4 for k ≥ 1. This improves the previous best known upper bound of Mubayi and Vishwanathan in the exponent by a factor which is asymptotically two. Note that these bounds are sharp up to a lower order factor in the exponent by the result of Balodis et al.