On Ricci Solitons and Harmonic Vector Fields in the Thurston Geometry F4

Abstract

In this paper, we consider a left-invariant Riemannian metric g on the Lie group F4. We classify Ricci solitons on (F4,g) and show that all such solitons are expanding and non-gradient. Moreover, we study the existence of harmonic maps from compact Riemannian manifolds into (F4,g). Finally, we characterize a class of harmonic vector fields on (F4,g).

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