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>モノドロミーの歴史(だれがいつ?)を調べていたのだが

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https://arxiv.org/abs/1507.00711
Monodromy and normal forms
Fabrizio Catanese (Universitaet Bayreuth)
(Submitted on 2 Jul 2015)
https://arxiv.org/pdf/1507.00711.pdf
MONODROMY AND NORMAL FORMS
FABRIZIO CATANESE
Abstract. We discuss the history of the monodromy theorem,
starting from Weierstras, and the concept of monodromy group.
From this viewpoint we compare then the Weierstras, the Legendre and other normal forms for elliptic curves, explaining their
geometric meaning and distinguishing them by their stabilizer in
PSL(2, Z) and their monodromy. Then we focus on the birth of
the concept of the Jacobian variety, and the geometrization of the
theory of Abelian functions and integrals. We end illustrating the
methods of complex analysis in the simplest issue, the difference
equation f(z) = g(z + 1) ? g(z) on C.

Introduction
In Jules Verne’s novel of 1874, ‘Le Tour du monde en quatre-vingts
jours’ , Phileas Fogg is led to his remarkable adventure by a bet made
in his Club: is it possible to make a tour of the world in 80 days?
Idle questions and bets can be very stimulating, but very difficult
to answer when they deal with the history of mathematics, and one
asks how certain ideas, which have been a common knowledge for long
time, did indeed evolve and mature through a long period of time, and
through the contributions of many people.
In short, there are three idle questions which occupy my attention
since some time:

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