Cohomogeneity-one G2-Laplacian flow on 7-torus
Abstract
We prove the hypersymplectic flow of simple type on standard torus T4 exists for all time and converges to the standard flat structure modulo diffeomorphisms. This result in particular gives the first example of a cohomogeneity-one G2-Laplacian flow on a compact 7-manifold which exists for all time and converges to a torsion-free G2 structure modulo diffeomorphisms.
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