Existence, Convergence and Limit Map of the Laplacian Flow
Abstract
We prove short time existence and uniqueness of the Laplacian flow starting at an arbitrary closed G2-structure. We establish long time existence and convergence of the Laplacian flow starting near a torsion-free G2-structure. We analyze the limit map of the Laplacian flow in relation to the moduli space of torsion-free G2-structures. We also present a number of results which constitute a fairly complete algebraic and analytic basis for studying the Laplacian flow.
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