On the EO-orientability of vector bundles

Abstract

We study the orientability of vector bundles with respect to a family of cohomology theories called EO-theories. The EO-theories are higher height analogues of real K-theory KO. For each EO-theory, we prove that the direct sum of i copies of any vector bundle is EO-orientable for some specific integer i. Using a splitting principal, we reduce to the case of the canonical line bundle over CP∞. Our method involves understanding the action of an order p subgroup of the Morava stabilizer group on the Morava E-theory of CP∞. Our calculations have another application: We determine the homotopy type of the S1-Tate spectrum associated to the trivial action of S1 on all EO-theories.