Rieffel projections and 2-by-2 matrices

Abstract

For a compact space Y, we view C(Y× S1) as the crossed product C(Y), with Z acting trivially. This allows us to study Rieffel projections in M2(C(Y× S1)): we characterize them and compute their image under the projection ∂0:K0(C(Y× S1))→ K1(C(Y)). We provide a new Rieffel projection in M2(C(T2)), different from Loring's one, and involving only trigonometric polynomials plus the square root of 2-e2π iθ-e-2π iθ. We give applications of this projection, e.g. explicit generators for the K-theory of C(T3). Finally, we prove that, if a Banach algebra completion B of C[Zn] is continuously contained in C(Tn) and such that the Fourier series of (2-e2π iθj-e-2π iθj)1/2\;(j=1,...,n) converges in B, then the inclusion B C(Tn) induces isomorphisms in K-theory.