Stolz Positive Scalar Curvature Structure Groups, Proper Actions and Equivariant 2-Types
Abstract
In this note, we study equivariant versions of Stolz' R-groups, the positive scalar curvature structure groups R spinn(X)G, for proper actions of discrete groups G. We define the concept of a fundamental groupoid functor for a G-space, encapsulating all the fundamental group information of all the fixed point sets and their relations. We construct classifying spaces for fundamental groupoid functors. As a geometric result, we show that Stolz' equivariant R-group R spinn(X)G depends only on the fundamental groupoid functor of the reference space X. The proof covers at the same time in a concise and clear way the classical non-equivariant case.
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