Constructing highly regular expanders from hyperbolic Coxeter groups

Abstract: A graph X is defined inductively to be (a0, . . . , an−1)-regular if X is a0-regular and for every vertex v of X, the sphere of radius 1 around v is an (a1, . . . , an−1)-regular graph. Such a graph X is said to be highly regular (HR) of level n if an−1 = 0. Chapman, Linial and Peled [CLP20] studied HR-graphs of level 2 and provided several methods to construct families of graphs which are expanders "globally and locally". They ask whether such HR-graphs of level 3 exist.In this paper we show how the theory of… Show more

“…It was proven in [25] (using results from [26]) that all hyperbolic regular tessellations {r, s} give families of sregular expander graphs. Unfortunately, we are not aware of any explicit bounds on λ 2 .…”

“…The discussion above indicates that hyperbolic expanders are related to Cayley graphs Cay PSL(2, q), { R, S, R−1 , S−1 } . This relation is made precise in [25] by defining a quasi-isometry between them.…”

Balanced Product Quantum Codes

“…It was proven in [25] (using results from [26]) that all hyperbolic regular tessellations {r, s} give families of sregular expander graphs. Unfortunately, we are not aware of any explicit bounds on λ 2 .…”

“…The discussion above indicates that hyperbolic expanders are related to Cayley graphs Cay PSL(2, q), { R, S, R−1 , S−1 } . This relation is made precise in [25] by defining a quasi-isometry between them.…”

Balanced Product Quantum Codes

“…4. Conder, Lubotzky, Schillewaert and Thilmany have made public a manuscript [5] where they (a) Independently discover the (120, 12, 5, 2)-regular family mentioned above, and calculate its expansion. (b) Manage to create an infinite families of (d 0 , .…”

Hyper-regular graphs and high dimensional expanders