Basmajian's identity over non-Archimedean local fields

Abstract

Let be a connected compact oriented surface with boundary and negative Euler characteristic. Let k be a non-Archimedean local field. In this paper, we prove Basmajian's identity for projective Anosov representations π1 PSL(d,k), d 2. Our series identity exhibits a drastic difference from all the Basmajian-type identities over the Archimedean fields R and C. In particular, the series is a signed finite sum. When d=2, we give a geometric proof of the identity using Berkovich hyperbolic geometry.

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