Duality in BP<n> (co)homology

Abstract

Let E=BP<n> denote the Johnson-Wilson spectrum, localized at p. It is proved that if E*(X) is locally finite, then there is an isomorphism of right E*-modules E*(X) = (E*(SigmaD+n+1X))V, where D=Sum |vi| and MV=Hom(M,Q/Z) is the Pontryagin dual. This result was motivated by work of the author and W.S.Wilson regarding the 2-local ku-homology and -cohomology of the Eilenberg-MacLane space K(Z/2,2).

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