Spelling suggestions: "subject:"'etwa' invariant""
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Analytic Torsion, the Eta Invariant, and Closed Differential Forms on Spaces of MetricsAndreae, Phillip January 2016 (has links)
<p>The central idea of this dissertation is to interpret certain invariants constructed from Laplace spectral data on a compact Riemannian manifold as regularized integrals of closed differential forms on the space of Riemannian metrics, or more generally on a space of metrics on a vector bundle. We apply this idea to both the Ray-Singer analytic torsion</p><p>and the eta invariant, explaining their dependence on the metric used to define them with a Stokes' theorem argument. We also introduce analytic multi-torsion, a generalization of analytic torsion, in the context of certain manifolds with local product structure; we prove that it is metric independent in a suitable sense.</p> / Dissertation
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A remark on the index of symmetric operatorsFedosov, Boris, Schulze, Bert-Wolfgang, Tarkhanov, Nikolai N. January 1998 (has links)
We introduce a natural symmetry condition for a pseudodifferential operator on a manifold with cylindrical ends ensuring that the operator admits a doubling across the boundary. For such operators we prove an explicit index formula containing, apart from the Atiyah-Singer integral, a finite number of residues of the logarithmic derivative of the conormal symbol.
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On the index formula for singular surfacesFedosov, Boris, Schulze, Bert-Wolfgang, Tarkhanov, Nikolai January 1997 (has links)
In the preceding paper we proved an explicit index formula for elliptic pseudodifferential operators on a two-dimensional manifold with conical points. Apart from the Atiyah-Singer integral, it contains two additional terms, one of the two being the 'eta' invariant defined by the conormal symbol. In this paper we clarify the meaning of the additional terms for differential operators.
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The index of higher order operators on singular surfacesFedosov, Boris, Schulze, Bert-Wolfgang, Tarkhanov, Nikolai N. January 1998 (has links)
The index formula for elliptic pseudodifferential operators on a two-dimensional manifold with conical points contains the Atiyah-Singer integral as well as two additional terms. One of the two is the 'eta' invariant defined by the conormal symbol, and the other term is explicitly expressed via the principal and subprincipal symbols of the operator at conical points. In the preceding paper we clarified the meaning of the additional terms for first-order differential operators. The aim of this paper is an explicit description of the contribution of a conical point for higher-order differential operators. We show that changing the origin in the complex plane reduces the entire
contribution of the conical point to the shifted 'eta' invariant. In turn this latter is expressed in terms of the monodromy matrix for an ordinary differential equation defined by the conormal symbol.
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Elliptic operators in even subspacesSavin, Anton, Sternin, Boris January 1999 (has links)
An elliptic theory is constructed for operators acting in subspaces defined via even pseudodifferential projections. Index formulas are obtained for operators on compact manifolds without boundary and for general boundary value problems.
A connection with Gilkey's theory of η-invariants is established.
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Elliptic operators in odd subspacesSavin, Anton, Sternin, Boris January 1999 (has links)
An elliptic theory is constructed for operators acting in subspaces defined via even pseudodifferential projections. Index formulas are obtained for operators on compact manifolds without boundary and for general boundary value problems.
A connection with Gilkey's theory of η-invariants is established.
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Elliptic operators in subspaces and the eta invariantSchulze, Bert-Wolfgang, Savin, Anton, Sternin, Boris January 1999 (has links)
The paper deals with the calculation of the fractional part of the η-invariant for elliptic self-adjoint operators in topological terms. The method used to obtain the corresponding formula is based on the index theorem for elliptic operators in subspaces obtained in [1], [2]. It also utilizes K-theory with coefficients Zsub(n). In particular, it is shown that the group K(T*M,Zsub(n)) is realized by elliptic operators (symbols) acting in appropriate subspaces.
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Eta-invariant and Pontrjagin duality in K-theorySavin, Anton, Sternin, Boris January 2000 (has links)
The topological significance of the spectral Atiyah-Patodi-Singer η-invariant is investigated. We show that twice the fractional part of the invariant is computed by the linking pairing in K-theory with the orientation bundle of the manifold. The Pontrjagin duality implies the nondegeneracy of the linking form. An example of a nontrivial fractional part for an even-order operator is presented.
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Eta invariant and parity conditionsSavin, Anton, Sternin, Boris January 2000 (has links)
We give a formula for the η-invariant of odd order operators on even-dimensional manifolds, and for even order operators on odd-dimensional manifolds. Geometric second order operators are found with nontrivial η-invariants. This solves a problem posed by P. Gilkey.
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