Harmonic Forms, Price Inequalities, and Benjamini-Schramm Convergence
Abstract
We study Betti numbers of sequences of Riemannian manifolds which
Benjamini-Schramm converge to their universal covers. Using the Price
inequalities we developed elsewhere, we derive two distinct convergence
results. First, under a negative Ricci curvature assumption and no assumption
on sign of the sectional curvature, we have a convergence result for weakly
uniform discrete sequences of closed Riemannian manifolds. In the negative
sectional curvature case, we are able to remove the weakly uniform discreteness
assumption. This is achieved by combining a refined Thick-Thin decomposition
together with a Moser iteration argument for harmonic forms on manifolds with
boundary.
Type
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Mark A. Stern
Professor of Mathematics
The focus of Professor Stern's research is the study of analytic problems arising
in geometry, topology, physics, and number theory.
In recent work, Professor Stern has studied analytical, geometric, and topological
questions arising from Yang-Mills theory, Hodge theory, and number theory. These have
led for example to a study of (i) stability questions arising in Yang Mills theory
and harmonic maps, (ii) energy minimizing connections and instantons, (iii) new bounds
for e
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