4-dimensional Frobenius manifolds and Painleve' VI
classification
🧮 math-ph
math.AGmath.MPnlin.SI
keywords
frobeniusdimensionmanifoldcaseexplicitfourtri-hamiltonianassociating
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A Frobenius manifold has tri-hamiltonian structure if it is even-dimensional and its spectrum is maximally degenerate. We focus on the case of dimension four and show that, under the assumption of semisimplicity, the corresponding isomonodromic Fuchsian system is described by the Painlev\'e VI$\mu$ equation. This yields an explicit procedure associating to any semisimple Frobenius manifold of dimension three a tri-hamiltonian Frobenius manifold of dimension four. We carry out explicit examples for the case of Frobenius structures on Hurwitz spaces.
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