Paul Kirk scite author profile

Abstract. Several proofs have been published of the mod Z gluing formula for the η-invariant of a Dirac operator. However, so far the integer contribution to the gluing formula for the η-invariant is left obscure in the literature. In this article we present a gluing formula for the η-invariant which expresses the integer contribution as a triple index involving the boundary conditions and the Calderón projectors of the two parts of the decomposition. The main ingredients of our presentation are the ScottWojciechowski theorem for the determinant of a Dirac operator on a manifold with boundary and the approach of Brüning-Lesch to the mod Z gluing formula.Our presentation includes careful constructions of the Maslov index and triple index in a symplectic Hilbert space. As a byproduct we give intuitively appealing proofs of two theorems of Nicolaescu on the spectral flow of Dirac operators.As an application of our methods, we carry out a detailed analysis of the η-invariant of the odd signature operator coupled to a flat connection using adiabatic methods. This is used to extend the definition of the Atiyah-Patodi-Singer ρ-invariant to manifolds with boundary. We derive a "non-additivity" formula for the AtiyahPatodi-Singer ρ-invariant and relate it to Wall's non-additivity formula for the signature of even-dimensional manifolds.

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Lecture Notes in Algebraic Topology

Davis

Kirk

2001

195

193

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Chern-Simons invariants of 3-manifolds and representation spaces of knot groups

1990

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Chern-Simons invariants of 3-manifolds decomposed along tori and the circle bundle over the representation space ofT 2

1993

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Paul Kirk

Twisted Alexander Invariants, Reidemeister Torsion, and Casson–gordon Invariants

The [eta]-invariant, Maslov index, and spectral flow for Dirac-type operators on manifolds with boundary

Lecture Notes in Algebraic Topology

Chern-Simons invariants of 3-manifolds and representation spaces of knot groups

Chern-Simons invariants of 3-manifolds decomposed along tori and the circle bundle over the representation space ofT 2

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