On the spectral radius of the non-backtracking matrix of the configuration model
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We prove a concentration result for the leading eigenvalue of the non--backtracking matrix of the configuration model under the assumption of uniformly bounded degrees. Let $P$ denote the limiting degree distribution. Assuming polynomial approximation, we show that as the number of vertices tends to infinity, the leading eigenvalue of the non--backtracking matrix concentrates around \[ \frac{\mathbb{E}[P(P-1)]}{\mathbb{E}[P]}. \] This quantity corresponds to the mean offspring number of the excess--degree branching process associated with the local limit of the configuration model. As a byproduct of our work we explain how this result can be applied to prove the density of the growth rates of the subgroups of the free group.
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On the growth spectrum of hyperbolic groups
For free and surface groups acting convex-cocompactly on hyperbolic spaces the growth spectrum is [0, ω_G]; for any hyperbolic group it contains [0, ω_G/2] (strictly larger if divergent).
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