On the structure of the RO(G)-graded homotopy of HM for cyclic p-groups
Abstract
We study the structure of the RO(G)-graded homotopy Mackey functors of any Eilenberg-MacLane spectrum HM for G a cyclic p-group. When R is a Green functor, we define orientation classes uV for HR and deduce a generalized gold relation. We deduce the aV,uV-isomorphism regions of the RO(G)-graded homotopy Mackey functors and prove two induction theorems. As applications, we compute the positive cone of HA, as well as the positive and negative cones of HZ. The latter two cones are essential to the slice spectral sequences of MU((C2n)) and its variants.
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