SPECTRAL FLOW, INDEX AND THE SIGNATURE OPERATOR
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Publication:3168760
DOI10.1142/S1793525311000477zbMath1216.58007arXiv0911.2862OpenAlexW2963076257MaRDI QIDQ3168760
Publication date: 19 April 2011
Published in: Journal of Topology and Analysis (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/0911.2862
Related Items
The KO-valued spectral flow for skew-adjoint Fredholm operators ⋮ The index formula and the spectral shift function for relatively trace class perturbations ⋮ Two-cocycle twists and Atiyah–Patodi–Singer index theory ⋮ Eta and rho invariants on manifolds with edges ⋮ The APS-index and the spectral flow
Cites Work
- Unnamed Item
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- The Robbin--Salamon index theorem in Banach spaces with UMD
- Spectral flow is the integral of one forms on the Banach manifold of self adjoint Fredholm operators
- Homotopy invariance of foliation Betti numbers
- Von Neumann index theorems for manifolds with boundary
- Dirac index classes and the noncommutative spectral flow
- Bounds on the von Neumann dimension of \(L^ 2\)-cohomoloy and the Gauss- Bonnet theorem for open manifolds
- Spectral flow in Fredholm modules, eta invariants and the JLO cocycle
- A \(K\)-theoretic relative index theorem and Callias-type Dirac operators
- The local index formula in semifinite von Neumann algebras. II: the even case
- Fredholm theories in von Neumann algebras. I
- Fredholm theories in von Neumann algebras. II
- Unbounded Fredholm Operators and Spectral Flow
- The Spectral Flow and the Maslov Index
