An Upper bound on the growth of Dirichlet tilings of hyperbolic spaces
Abstract
It is shown that the growth rate (r |B(r)|1/r) of any k faces Dirichlet tiling of the real hyperbolic space Hd, d>2, is at most k-1-ε, for an ε > 0, depending only on k and d. We don't know if there is a universal εu > 0, such that k-1-εu upperbounds the growth rate for any k-regular tiling, when d > 2?
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