Range of random Z-homomorphisms on weak expanders

Abstract

We prove that random Z-homomorphisms on weakly expanding bipartite graphs exhibit a strong "flatness" phenomenon. Extending prior work of Peled, Samotij, and Yehudayoff for expanders, we first show that on any bipartite (n, d, λ)-graph with λ ≤ (1-δ)d, a uniformly chosen Z-homomorphism has a range at most O( n) with high probability, which is tight up to a constant factor. This provides an affirmative answer to their question in the spectral setting. As a concrete application, we prove that a random Z-homomorphism on the middle layers of the Hamming cube takes at most 5 values with high probability. This shows that the O(1)-flatness for the full Hamming cube, proved by Kahn and Galvin, persists even when the rigid structural properties are relaxed.