Yu. V. Brezhnev
Published 2010-11-03, updated 2012-10-15Version 4
We show that four exceptional Fuchsian equations, each determined by the four parabolic singularities, known as the Chudnovsky equations, are transformed into each other by algebraic transformations. We describe equivalence of these equations and their counterparts on tori. The latter are the Fuchsian equations on elliptic curves and their equivalence is characterized by transcendental transformations which are represented explicitly in terms of elliptic and theta functions.
Comments: Final version; LaTeX, 27 pages, 1 table, no figures
Journal: Journal of Differential Equations (2012) v.253, 3727-3751
Algebraic transformations of Gauss hypergeometric functions
Theta Functions, Elliptic Hypergeometric Series, and Kawanaka's Macdonald Polynomial Conjecture
Dimension reduction techniques for the minimization of theta functions on lattices
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