Towards Constructing Ramanujan Graphs Using Shift Lifts

Abstract

In a breakthrough work, Marcus-Spielman-Srivastava recently showed that every d-regular bipartite Ramanujan graph has a 2-lift that is also d-regular bipartite Ramanujan. As a consequence, a straightforward iterative brute-force search algorithm leads to the construction of a d-regular bipartite Ramanujan graph on N vertices in time 2O(dN). Shift k-lifts studied by Agarwal-Kolla-Madan lead to a natural approach for constructing Ramanujan graphs more efficiently. The number of possible shift k-lifts of a d-regular n-vertex graph is knd/2. Suppose the following holds for k=2(n): There exists a shift k-lift that maintains the Ramanujan property of d-regular bipartite graphs on n vertices for all n. (*) Then, by performing a similar brute-force search algorithm, one would be able to construct an N-vertex bipartite Ramanujan graph in time 2O(d\,log2 N). Furthermore, if (*) holds for all k ≥ 2, then one would obtain an algorithm that runs in polyd(N) time. In this work, we take a first step towards proving (*) by showing the existence of shift k-lifts that preserve the Ramanujan property in d-regular bipartite graphs for k=3,4.