We consider the remainder term in the semiclassical limit formula for the eta
invariant on a metric contact manifold, proving in general that it is
controlled by volumes of recurrence sets of the Reeb flow. This particularly
gives a logarithmic improvement of the remainder for Anosov Reeb flows, while
for certain elliptic flows the improvement is in terms of irrationality
measures of corresponding Floquet exponents

Savale, Nikhil

English

arXiv

We consider the remainder term in the semiclassical limit formula for the eta
invariant on a metric contact manifold, proving in general that it is
controlled by volumes of recurrence sets of the Reeb flow. This particularly
gives a logarithmic improvement of the remainder for Anosov Reeb flows, while
for certain elliptic flows the improvement is in terms of irrationality
measures of corresponding Floquet exponents.Comment: Important referee correction regarding Ehrenfest time in version 2.
  To appear in CPD

Hyperbolicity, irrationality exponents and the eta invariant

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