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Orthogonal 2-sphere basis of stable 4-sphere

Akio Kawauchi

Abstract

It is known by Wall that any two orthogonal bases of every stable 4-sphere are transformed into each other by an orientation-preserving diffeomorphism of the stable 4-sphere. In this paper another proof of Wall's result is presented, strengthened in the sense that the diffeomorphism is taken as the lift of an equivalence of a trivial surface-knot space to the double branched covering space identified with the stable 4-sphere.

Orthogonal 2-sphere basis of stable 4-sphere

Abstract

It is known by Wall that any two orthogonal bases of every stable 4-sphere are transformed into each other by an orientation-preserving diffeomorphism of the stable 4-sphere. In this paper another proof of Wall's result is presented, strengthened in the sense that the diffeomorphism is taken as the lift of an equivalence of a trivial surface-knot space to the double branched covering space identified with the stable 4-sphere.
Paper Structure (26 equations)

This paper contains 26 equations.