From Rational Homotopy to K-Theory for Continuous Trace Algebras

Abstract

Let A be a unital C*-algebra. Its unitary group, UA, contains a wealth of topological information about A. However, the homotopy type of UA is out of reach even for A = M2(). There are two simplifications which have been considered. The first, well-traveled road, is to pass to π*(U(A )) which is isomorphic (with a degree shift) to K*(A). This approach has led to spectacular success in many arenas, as is well-known. A different approach is to consider π*(UA) , the rational homotopy of UA. In joint work with G. Lupton and N. C. Phillips we have calculated this functor for the cases A = C(X) Mn() and A a unital continuous trace C*-algebra. In this note we look at some concrete examples of this calculation and, in particular, at the -graded map \[ π *(UA) K*+1(A) . \]