Higher eta-invariants
John LottDepartment of Mathematics, University of Michigan, Ann Arbor, MI 48109, U.S.A.,
ABI
Abstract
We define the higher eta-invariant of a Dirac-type operator on a nonsimply-connected closed manifold. We discuss its variational properties and how it would fit into a higher index theorem for compact manifolds with boundary. We give applications to questions of positive scalar curvature for manifolds with boundary, and to a Novikov conjecture for manifolds with boundary.
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