Twisted limit formula for torsion and cyclic base change

Abstract

Let G be the group of complex points of a real semi-simple Lie group whose fundamental rank is equal to 1, e.g. G= 2 () × 2 () or 3 (). Then the fundamental rank of G is 2, and according to the conjecture made in BV, lattices in G should have 'little' --- in the very weak sense of 'subexponential in the co-volume' --- torsion homology. Using base change, we exhibit sequences of lattices where the torsion homology grows exponentially with the square root of the volume. This is deduced from a general theorem that compares twisted and untwisted L2-torsions in the general base-change situation. This also makes uses of a precise equivariant 'Cheeger-M\"uller Theorem' proved by the second author Lip1.