On homogeneous closed gradient Laplacian solitons

Abstract

We prove a structure theorem for homogeneous closed gradient Laplacian solitons and use it to show some examples of closed Laplacian solitons cannot be made gradient. More specifically, we show that the Laplacian solitons on nilpotent Lie groups found by Nicolini are not gradient up to homothetic G2-structures except for N1, where f must be a Gaussian. We also show that the closed G2-structure 12 on N12 constructed by Fern\'andez-Fino-Manero cannot be a gradient soliton. We further show that closed non-torsion-free gradient Laplacian solitons on almost abelian solvmanifolds are isometric to products N × Rk with f constant on N.