Spaces of sections of Banach algebra bundles

Abstract

Suppose that B is a G-Banach algebra over F = R or C, X is a finite dimensional compact metric space, ζ : P X is a standard principal G-bundle, and Aζ = (X, P ×G B) is the associated algebra of sections. We produce a spectral sequence which converges to π*(GLo Aζ) with [E2-p,q Hp(X ; πq(GLo B)).] A related spectral sequence converging to *+1(Aζ) (the real or complex topological K-theory) allows us to conclude that if B is Bott-stable, (i.e., if π*(GLo B) *+1(B) is an isomorphism for all *>0) then so is Aζ.