My question is about Newton's bucket experiment. If a sphere filled (say) one-third with water is rotated very very fast, will the water eventually spread out across and coat the entire interior surface of the sphere? If so, then does this mean that the sphere's inside is coated with water whose inertial force is everywhere at right angles to the surface? And if this is so, then does this phenomenon offer a primitive physical model for the topological "gluing" together of two 3-dimensional 2-spheres to yield a 4-dimensional 3-sphere, especially when the gluing is imagined according to the method of progressive longitudinal "slices"? I'm trying to visualize William Blake's Mundane Shell, which Bronowski first half-recognized as a 3-sphere in 1942.