Invertible functions on non-archimedean symmetric spaces
Abstract
Let u be a nowhere vanishing holomorphic function on the Drinfeld space r of dimension r-1, where r ≥ 2. The logarithm q u of its absolute value may be regarded as an affine function on the attached Bruhat-Tits building BTr. Generalizing a construction of van der Put in case r=2, we relate the group O(r)* of such u with the group H(BTr, Z) of integer-valued harmonic 1-cochains on BTr. This also gives rise to a natural Z-structure on the first (-adic or de Rham) cohomology of r.
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