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1. • CommentRowNumber1.
   • CommentAuthorUrs
   • CommentTimeDec 9th 2014
   • (edited Dec 9th 2014)
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   Author: Urs
   Format: MarkdownItexadded to _[[eta invariant]]_ a lightning section _[On manifolds with boundaries: as sections of the determinant line](http://ncatlab.org/nlab/show/eta+invariant#OnManifoldsWithBoundary)_, essentially just a glorified pointer to [Freed 95](http://ncatlab.org/nlab/show/eta+invariant#Freed95) for the time being.

   added to eta invariant a lightning section On manifolds with boundaries: as sections of the determinant line, essentially just a glorified pointer to Freed 95 for the time being.

2. • CommentRowNumber2.
   • CommentAuthorUrs
   • CommentTimeDec 10th 2014
   • (edited Dec 10th 2014)
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   Author: Urs
   Format: MarkdownItexI have added some more pointers to this section, and renamed it to _[Boundaries, determinant line bundles and perturbative Chern-Simons](http://ncatlab.org/nlab/show/eta+invariant#OnManifoldsWithBoundary)_. In summary and schematically we have: 1. the exponentiated eta invariant $\exp(i \pi \, \eta)$ on a suitable 3-manifold is the Selberg zeta function of odd type; 1. it satisfies the sewing constraints that make it an Atiyah-style TQFT 1. and in fact it is one factor (the actual quantum factor on top of the classical contribution) in the perturbative path integral of Chern-Simons theory. So if or to the extent that number-theoretic zeta functions are "really" analogous to Selberg zeta functions of odd type, this would give a rather suggestive way of thinking about them geometrically.

   I have added some more pointers to this section, and renamed it to Boundaries, determinant line bundles and perturbative Chern-Simons.

   In summary and schematically we have:

   1. the exponentiated eta invariant $\exp(i \pi \, \eta)$ on a suitable 3-manifold is the Selberg zeta function of odd type;

   2. it satisfies the sewing constraints that make it an Atiyah-style TQFT

   3. and in fact it is one factor (the actual quantum factor on top of the classical contribution) in the perturbative path integral of Chern-Simons theory.

   So if or to the extent that number-theoretic zeta functions are “really” analogous to Selberg zeta functions of odd type, this would give a rather suggestive way of thinking about them geometrically.

3. • CommentRowNumber3.
   • CommentAuthorUrs
   • CommentTimeJun 24th 2015
   • (edited Jun 24th 2015)
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   Author: Urs
   Format: MarkdownItexTo that section _[Boundaries, determinant line bundles and perturbative Chern-Simons](http://ncatlab.org/nlab/show/eta+invariant#OnManifoldsWithBoundary)_ I have added pointer to [Witten's talk](http://ncatlab.org/nlab/show/eta+invariant#Witten15) this week at Strings2015, which amplifies the result by Dai-Freed reviewed in the $n$Lab entry.

   To that section Boundaries, determinant line bundles and perturbative Chern-Simons I have added pointer to Witten’s talk this week at Strings2015, which amplifies the result by Dai-Freed reviewed in the $n$Lab entry.