Bott Periodicity, Submanifolds, and Vector Bundles

Abstract

We sketch a geometric proof of the classical theorem of Atiyah, Bott, and Shapiro ABS which relates Clifford modules to vector bundles over spheres. Every module of the Clifford algebra Clk defines a particular vector bundle over k+1, a generalized Hopf bundle, and the theorem asserts that this correspondence between Clk-modules and stable vector bundles over k+1 is an isomorphism modulo Clk+1-modules. We prove this theorem directly, based on explicit deformations as in Milnor's book on Morse theory M, and without referring to the Bott periodicity theorem as in ABS.