Positive scalar curvature and Poincaré duality for proper actions

Hao Guo; Varghese Mathai; Hang Wang

doi:10.4171/jncg/321

JournalsjncgVol. 13, No. 4pp. 1381–1433

Positive scalar curvature and Poincaré duality for proper actions

Hao Guo
Texas A&M University, College Station, USA
Varghese Mathai
University of Adelaide, Australia
Hang Wang
East China Normal University, Shanghai, China

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Abstract

For $G$ an almost-connected Lie group, we study $G$ -equivariant index theory for proper co-compact actions with various applications, including obstructions to and existence of $G$ -invariant Riemannian metrics of positive scalar curvature. We prove a rigidity result for almost-complex manifolds, generalising Hattori’s results, and an analogue of Petrie’s conjecture. When $G$ is an almost-connected Lie group or a discrete group, we establish Poincaré duality between $G$ -equivariant $K$ -homology and $K$ -theory, observing that Poincaré duality does not necessarily hold for general $G$ .

Cite this article

Hao Guo, Varghese Mathai, Hang Wang, Positive scalar curvature and Poincaré duality for proper actions. J. Noncommut. Geom. 13 (2019), no. 4, pp. 1381–1433

DOI 10.4171/JNCG/321