Conformal properties of spheres

We identify the cone of smooth metrics M (M) on a manifold Mⁿ with the space of smooth isometric embeddings fg: (M, g) (S^, ) into a standard sphere of large dimension = (n), and their isotopic deformations, and the space C (M) of conformal classes with the embeddings of metrics in the same conformal class, isotopic to each other by conformal deformations. Uniform limits of C¹ isometric embeddings of a metric, or isometric embeddings of metrics on M with a different smooth structure, and their deformations, are carried by (S^, ) also, but when the latter exist, they do not embed into a smooth flow of any fg (M) S^. We characterize the metrics of constant scalar curvature by properties of their isometric embeddings, and use it to prove a homotopy lifting property of the bundle M (M) C (M) by Yamabe metrics. When M carries an almost complex structure J₀, this result extends to a homotopy lifting property of the bundle M^J₀ (M) C^J₀ (M) of metrics, compatible with some J in the same orientation class as J₀, and their classes, the lift now by almost Hermitian Yamabe metrics. We use these results and the gap theorem of Simons to study the existence and integrability properties of almost complex structures on spheres, and products. We find the sigma invariants of Sp (2) and the M⁷ₖ spheres of Milnor, and with one exception, the almost Hermitian sigma invariant of any product of spheres with almost complex structures. We organize all manifolds with Yamabe, or almost Hermitian Yamabe metrics on them, in a Pascal like triangle, set according to their dimensions and symmetries, and the values of their associated conformal invariants.