WDVV Equations, Darboux-Egoroff Metric and the Dressing Method
classification
🧮 math-ph
hep-thmath.MPnlin.SI
keywords
canonicalcommutingdressingequationsflowsintegrablestructurethree-dimensional
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Dressing technique is used to construct commuting Lax operators which provide an integrable (canonical) structure behind Witten--Dijkgraaf--Verlinde--Verlinde equations. The commuting flows are related to the isomonodromic flows. Examples of the canonical integrable structure are given in two- and three-dimensional cases. The three-dimensional example is associated with the rational Landau-Ginzburg potentials.
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