Generalized Geometry of 2D Incompressible Fluid Flows
Abstract
We describe a family of generalized almost structures associated with a Monge-Amp\`ere equation for a stream function of 2D incompressible fluid flows. Using an indefinite metric field constructed from a pair of 2-forms related to the Monge-Amp\`ere equation, we show the existence of generalized metric-compatible structures in our family of generalized structures. The integrability of isotropic structures on the level of Dirac structures and differential forms is discussed.
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