On Drinfeld modular forms of higher rank II
Abstract
We show that the absolute value |f| of an invertible holomorphic function f on the Drinfeld symmetric space r (r ≥ 2) is constant on fibers of the building map to the Bruhat-Tits building . Its logarithm |f| is an affine map on the realization of . These results are used to study the vanishing loci of modular forms (coefficient forms, Eisenstein series, para-Eisenstein series) and to determine their images in .
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