Cayley Graphs Without a Bounded Eigenbasis

Author(s)

Sah, Ashwin; Sawhney, Mehtaab; Zhao, Yufei

Abstract

<jats:title>Abstract</jats:title> <jats:p>Does every $n$-vertex Cayley graph have an orthonormal eigenbasis all of whose coordinates are $O(1/\sqrt{n})$? While the answer is yes for abelian groups, we show that it is no in general. On the other hand, we show that every $n$-vertex Cayley graph (and more generally, vertex-transitive graph) has an orthonormal basis whose coordinates are all $O(\sqrt{\log n / n})$, and that this bound is nearly best possible. Our investigation is motivated by a question of Assaf Naor, who proved that random abelian Cayley graphs are small-set expanders, extending a classic result of Alon–Roichman. His proof relies on the existence of a bounded eigenbasis for abelian Cayley graphs, which we now know cannot hold for general groups. On the other hand, we navigate around this obstruction and extend Naor’s result to nonabelian groups.</jats:p>

Date issued

2020

URI

https://hdl.handle.net/1721.1/145890

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

International Mathematics Research Notices

Publisher

Oxford University Press (OUP)

Citation

Sah, Ashwin, Sawhney, Mehtaab and Zhao, Yufei. 2020. "Cayley Graphs Without a Bounded Eigenbasis." International Mathematics Research Notices, 2022 (8).

Version: Author's final manuscript