I like to explore and ask for proper references for the relations between generalized projective spaces, spheres, and exotic spheres:
The real projective space $\mathbb{RP}^1 \simeq S^1,$ is homeomorphic and diffeomorphic to 1-sphere $S^1.$
The complex projective space $\mathbb{CP}^1 \simeq S^2,$ is homeomorphic and diffeomorphic to 2-sphere $S^2.$
The quaternion projective space $\mathbb{HP}^1 \simeq S^4,$ is homeomorphic and diffeomorphic to 4-sphere $S^4.$
I am looking for general constructions of generalized projective spaces, and their relations to spheres, and exotic spheres. For example, we can consider generalized projective spaces homeomorphic to $S^8,S^{16},\dots, S^{2^n},$ etc., for $n\in \mathbb{N}$(yes ?).
Are they necessarily diffeomorphic to the standard spheres?
Are there generalized projective spaces of exotic spheres?
Can one consider the quotient manifold of generalized projective spaces to construct spheres, and/or exotic spheres?
(e.g. The 8-dimensional $\mathbb{HP}^{2}$ has a circle action, by the group of complex scalars of absolute value 1 acting on the other side (so on the right, instead of on the left action). Therefore we can obtain the quotient manifold $\mathbb{HP}^{2}/\mathrm{U}(1)$ with U(1) for the circle group. It has been shown that this quotient is the 7-sphere, a result of Arnold (1996), also later by Witten and Atiyah.)
Thank you in advance!
