Twists, Codazzi Tensors, and the 6-sphere

Abstract

Let (M,g,J,ω) be an almost Hermitian manifold. Given an automorphism ∈ Aut(TM), the existing structure can be twisted to obtain a new almost Hermitian manifold (M,g,J,ω). In the current paper, we study these -twisted almost Hermitian structures with particular emphasis on questions regarding the integrability of J and the Riemannian geometry of g. By studying the latter, we identity a certain class of Aut(TM) with nice transformation properties. We call these automorphisms g-Codazzi maps because of their close relationship with Codazzi tensors. The aforementioned results are ultimately applied to the standard nearly K\"ahler structure on the 6-sphere where we prove a nonintegrability result for the class of g-Codazzi maps.

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