Isomonodromic deformation of Lamé connections, Painlevé VI equation and Okamoto symmetry
Isomonodromic deformation of Lamé connections, Painlevé VI equation and Okamoto symmetry
A Lame connection is a logarithmic -connection over an elliptic curve , , having a single pole at infinity. When this connection is irreducible, we show that it is invariant under the standard involution and can be pushed down to a logarithmic -connection on with poles at 0, , and …