Laplacian flow of closed G2-structures inducing nilsolitons

Abstract

We study the existence of left invariant closed G2-structures defining a Ricci soliton metric on simply connected nonabelian nilpotent Lie groups. For each one of these G2-structures, we show long time existence and uniqueness of solution for the Laplacian flow on the noncompact manifold. Moreover, considering the Laplacian flow on the associated Lie algebra as a bracket flow on 7 in a similar way as in [23] we prove that the underlying metrics g(t) of the solution converge smoothly, up to pull-back by time-dependent diffeomorphisms, to a flat metric, uniformly on compact sets in the nilpotent Lie group, as t goes to infinity.