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Article overview
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On the essential minimum of Faltings' height | José Burgos Gil
; Ricardo Menares
; Juan Rivera-Letelier
; | Date: |
1 Sep 2016 | Abstract: | We study the essential minimum of the (stable) Faltings height on the moduli
space of elliptic curves. We show that, in contrast to the Weil height on a
projective space and the N{’e}ron-Tate height of an abelian variety, Faltings’
height takes at least two values that are smaller than its essential minimum.
We also compute the essential minimum up to five decimal places.
One of the main ingredients in our analysis is a good approximation of the
hyperbolic Green function associated to the cusp of the modular curve of level
one. To establish this approximation, we make an intensive use of distortion
theorems for univalent functions.
Our results have been motivated and guided by numerical experiments that are
described in detail in the companion files. | Source: | arXiv, 1609.0071 | Services: | Forum | Review | PDF | Favorites |
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