On Drinfeld modular forms of higher rank VI: The simplicial complex associated with a coefficient form

Abstract

The coefficient forms \( a k \) and the para-Eisenstein series \(αk\) are simplicial Drinfeld modular forms. We study the attached simplicial complexes \(BTr( a k)\) and \(BTr(αk)\), which are full subcomplexes of the Bruhat-Tits building \(BTr\) of \( PGL(r, K∞)\). They are connected (if the rank \(r\) is larger than 2), strongly equidimensional of codimension 1 in \(BTr\), boundaryless, and satisfy a symmetry property under the non-trivial involution of the Dynkin diagram \(Ar-1\).