On Hedetniemi's conjecture and the Poljak-Rodl function

Abstract

Hedetniemi conjectured in 1966 that (G × H) = \(G), (H)\ for any graphs G and H. Here G× H is the graph with vertex set V(G)× V(H) defined by putting (x,y) and (x',y') adjacent if and only if xx'∈ E(G) and yy'∈ V(H). This conjecture received a lot of attention in the past half century. It was disproved recently by Shitov. The Poljak-R\"odl function is defined as f(n) = \(G × H): (G)=(H)=n\. Hedetniemi's conjecture is equivalent to saying f(n)=n for all integer n. Shitov's result shows that f(n)<n when n is sufficiently large. Using Shitov's result, Tardif and Zhu showed that f(n) n - ( n)1/4 for sufficiently large n. Using Shitov's method, He--Wigderson showed that for ε ≈ 10-9 and n sufficiently large, f(n) (1-ε)n. In this note we prove that a slight modification of the proof in the paper of Zhu and Tardif shows that f(n) ( 12 + o(1))n for sufficiently large n. On the other hand, it is unknown whether f(n) is bounded by a constant. However, we do know that if f(n) is bounded by a constant, then the smallest such constant is at most 9. This lecture note gives self-contained proofs of the above mentioned results.