Convergence of the hypersymplectic flow on T4 with T3-symmetry
Abstract
A hypersymplectic structure on a 4-manifold is a triple ω1, ω2, ω3 of 2-forms for which every non-trivial linear combination a1ω1 + a2 ω2 + a3 ω3 is a symplectic form. Donaldson has conjectured that when the underlying manifold is compact, any such structure is isotopic in its cohomolgy class to a hyperk\"ahler triple. We prove this conjecture for a hypersymplectic structure on T4 which is invariant under the standard T3 action. The proof uses the hypersymplectic flow, a geometric flow which attempts to deform a given hypersymplectic structure to a hyperk\"ahler triple. We prove that on T4, when starting from a T3-invariant hypersymplectic structure, the flow exists for all time and converges modulo diffeomorphisms to the unique cohomologous hyperk\"ahler structure.
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