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Lattices in a split solvable Lie group

Published online by Cambridge University Press:  01 September 1997

RICHARD MOSAK
Affiliation:
CUNY Graduate Center, 33 West 42 Street, New York, NY 10036
MARTIN MOSKOWITZ
Affiliation:
Lehman College, CUNY, Bronx, NY 10468

Abstract

Given a Lie group, it is often useful to have a parametrization of the set of its lattices. In Euclidean space ℝn, for example, each lattice corresponds to a basis, and any lattice is equivalent to the standard integer lattice under an automorphism in GL(n, ℝ). In the nilpotent case, the lattices of the Heisenberg groups are classified, up to automorphisms, by certain sequences of positive integers with divisibility conditions (see [1]). In this paper we will study the set of lattices in a class of simply connected, solvable, but not nilpotent groups G. The construction of G depends on a diagonal n×n matrix Δ with distinct non-zero eigenvalues, of trace 0; we will write

formula here

Type
Research Article
Copyright
Cambridge Philosophical Society 1997

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