Positive Hermitian curvature flow on 2-step nilpotent Lie groups

Abstract

We study the positive Hermitian curvature flow for left-invariant metrics on 2-step nilpotent Lie groups with a left-invariant complex structure J. We describe the long-time behavior of the flow under the assumption that J[g, g] is contained in the center of g. We show that under our assumption the flow gt exists for all positive t and (G,(1+t)-1gt) converges, in the Cheeger-Gromov topology, to a 2-step nilpotent Lie group with a non flat semi-algebraic soliton. Moreover, we prove that, in our class of Lie groups, there exists at most one semi-algebraic soliton solution, up to homothety. Similar results were proved by M. Pujia and J. Stanfield for nilpotent complex Lie groups P2021, S2021. In the last part of the paper we study the Hermitian curvature flow for the same class of Lie groups.

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