Non-geometric property (T) of warped cones

Abstract

In this paper, we study the geometric property (T) for discretized warped cones of an action on a compact Lie group M by its finitely generated subgroup. We show that if a subgroup G is dense in M, then the associated discretized warped cone n M× \t(n)\ does not have geometric property (T) for any sequence of positive numbers \t(n)\n∈ N converging to ∞. This result applies to certain ergodic actions of groups with property (T), for example, the action of SO(d,Z[15]) on SO(d) with d≥ 5. As an application, we obtain new examples of expanders without geometric property (T), including certain superexpanders.

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