About coordinates on the phase-spaces of Schlesinger system (n+1 matrices, sl(2,C)-case) and Garnier--Painlev\'e 6 system
Abstract
The geometric model of the pathway linking Schlesinger and Garnier--Painlev\'e~6 systems based on an original orthonormalization of a set of elements in sl(2, C) is constructed. The explicit polynomial map of the Cartesian products of n-2 quadrics (the Zariski-topology chart of the phase space of the Garnier--Painlev\'e~6 system) into the phase space of the Schlesinger system and the rational inverse to this map are presented.
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