Note on algebro-geometric solutions to triangular Schlesinger systems
Abstract: We construct algebro-geometric upper triangular solutions of rank two Schlesinger systems. Using these solutions we derive two families of solutions to the sixth Painlev\'e equation with parameters $({1}/{8}, -{1}/{8}, {1}/{8}, {3}/{8})$ expressed in simple forms using periods of differentials on elliptic curves. Similarly for every integer $n$ different from $0$ and $-1$ we obtain one family of solutions to the sixth Painlev\'e equation with parameters $(\frac{9n2+12n+4}{8}, -\frac{n2}{8}, \frac{n2}{8}, \frac{4-n2}{8})$.
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