Abstract:
Based on Burnside's parametrization of the algebraic curve $y^2=x^5-x$ we obtain the remaining attributes of its uniformization: associated Fuchsian equations and their solutions, accessory parameters, monodromies, conformal maps, fundamental polygons, etc. As a generalization, we propose a way of uniformization of arbitrary curves by zero genus groups. In the hyperelliptic case all the objects of the theory are explicitly described. We consider a large number of examples and, briefly, applications: Abelian integrals, metrics of Poincaré, differential equations of the Jacobi–Chazy and Picard–Fuchs type, and others.
Key words and phrases:Uniformization of algebraic curves, Riemann surfaces, Fuchsian equations/groups, monodromy groups, accessory parameters, modular equations, conformal maps, curvelinear polygons, $\theta$-functions, Abelian integrals, metrics of Poincaré, moduli spaces.
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