Salem Numbers, Spectral Radii and Growth Rates of Hyperbolic Coxeter Groups

Abstract: We show that not every Salem number appears as the growth rate of a cocompact hyperbolic Coxeter group. We also give a new proof of the fact that the growth rates of planar hyperbolic Coxeter groups are spectral radii of Coxeter transformations, and show that this need not be the case for growth rates of hyperbolic tetrahedral Coxeter groups.

“…The second smallest growth rate among them is realised by the Coxeter triangle group OE8; 3 with Coxeter graph -8 ------and appears as the seventh smallest known Salem number 1:23039 given by the minimal polynomial t 10 t 7 t 5 t 3 C 1; see [22]. As a consequence, the growth rate of the cocompact Lambert quadrilateral group Q with Vinberg graph ---is strictly bigger than OE8;3 .…”

Hyperbolic Coxeter groups and minimal growth rates in dimensions four and five

“…The second smallest growth rate among them is realised by the Coxeter triangle group OE8; 3 with Coxeter graph -8 ------and appears as the seventh smallest known Salem number 1:23039 given by the minimal polynomial t 10 t 7 t 5 t 3 C 1; see [22]. As a consequence, the growth rate of the cocompact Lambert quadrilateral group Q with Vinberg graph ---is strictly bigger than OE8;3 .…”

Hyperbolic Coxeter groups and minimal growth rates in dimensions four and five