Cocompact lattices on An buildings

Abstract

Let K be the field of formal Laurent series over the finite field of order q. We construct cocompact lattices '0 < 0 in the group G = PGLd(K) which are type-preserving and act transitively on the set of vertices of each type in the building associated to G. The stabiliser of each vertex in '0 is a Singer cycle and the stabiliser of each vertex in 0 is isomorphic to the normaliser of a Singer cycle in PGLd(q). We then show that the intersections of '0 and 0 with PSLd(K) are lattices in PSLd(K), and identify the pairs (d,q) such that the entire lattice '0 or 0 is contained in PSLd(K). Finally we discuss minimality of covolumes of cocompact lattices in SL3(K). Our proofs combine a construction of Cartwright and Steger with results about Singer cycles and their normalisers, and geometric arguments.