Abstract
Using explicit methods, we provide an upper bound to the norm of the Busemann cocycle of a locally finite regular tree $X$, emphasizing the symmetries of the cocycle. The latter takes value into a submodule of square summable functions on the edges of $X$, which corresponds to the Steinberg representation for rank one groups acting on their Bruhat-Tits tree. The norm of the Busemann cocycle is asymptotically linear with respect to square root of the distance between any two vertices. Independently, Gournay and Jolissaint [10] proved an exact formula for harmonic 1-cocycles covering the present case.
Citation
Thibaut Dumont. "Norm growth for the Busemann cocycle." Bull. Belg. Math. Soc. Simon Stevin 25 (4) 507 - 526, december 2018. https://doi.org/10.36045/bbms/1546570906
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