Equivariant compactifications, trivial embeddability and finite type

Abstract

We characterize finite-type G-principal U-equivariant bundles on normal U-spaces for compact Lie groups U and G, in several ways, including (a) their extensibility across the U-equivariant compactification βUX and (b) their becoming finite-type upon extending the structure group along at least one U-equivariant compact-Lie-group embedding G K. This generalizes non-equivariant results of Phillips and the author's characterizing finite-type matrix-algebra bundles, upon specializing G to projective unitary groups. When the U-action on X has virtually abelian isotropy, matrix-algebra equivariant bundles are also finite-type precisely when, locally over a finite open U-cover, they are tensor factors of trivial matrix bundles. In a K-theoretic offshoot we prove that for U-actions with finite isotropy groups on compact Hausdorff spaces X equivariant vector bundles E X are factors of trivial bundles K-theoretically: there is a class a∈ KU(X) with [E]a the class of a bundle induced by a U-representation (which furthermore can be chosen so as to restrict to isotropy groups to multiples of the regular representations). This generalizes a result of Donovan and Karoubi.