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On the mean Euler characteristic of Gorenstein toric contact manifolds

We prove that the mean Euler characteristic of a Gorenstein toric contact manifold, i.e. a good toric contact manifold with zero first Chern class, is equal to half the normalized volume of the corresponding toric diagram and give some applications. A particularly interesting one, obtained using a result of Batyrev and Dais, is the following: twice the mean Euler characteristic of a Gorenstein toric contact manifold is equal to the Euler characteristic of any crepant toric symplectic filling, i.e. any toric symplectic filling with zero first Chern class.

preprint2020arXivOpen access
Miguel AbreuLeonardo Macarini
math.SGmath.GTmath.AG
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Miguel AbreuLeonardo Macarini

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