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Paper detail

An explicit formula for the discrete power function associated with circle patterns of Schramm type

We present an explicit formula for the discrete power function introduced by Bobenko, which is expressed in terms of the hypergeometric τfunctions for the sixth Painlevé equation. The original definition of the discrete power function imposes strict conditions on the domain and the value of the exponent. However, we show that one can extend the value of the exponent to arbitrary complex numbers except even integers and the domain to a discrete analogue of the Riemann surface. Moreover, we show that the discrete power function is an immersion when the real part of the exponent is equal to one.

preprint2012arXivOpen access
Hisashi AndoMike HayKenji KajiwaraTetsu Masuda
math.DGnlin.SI
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Hisashi AndoMike HayKenji KajiwaraTetsu Masuda

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