The special unitary groups SU(2n) as framed manifolds

Abstract

Let [SU(2n), L] denote the bordism class of SU(2n) (n 2) equipped with its left invariant framing L. Then it is well known that eC([SU(2n), L])=0 where eC denotes the complex Adams e-invariant. In this note we show that replacing L by the framing obtained by twisting it by a specific map the zero value of eC([SU(2n), L]) can be transformed into a generator of Im \, eC which is isomorphic to a cyclic group. In addition we show that the same procedure affords an analogous result for a quotient of SU(2n+1) by a circle subgroup which inherits a canonical framing from SU(2n+1) in the usual way. .