Morava K-theory rings of the extensions of C2 by the products of cyclic 2-groups

Abstract

In SCH1 Schuster proved that mod 2 Morava K-theory K(s)*(BG) is evenly generated for all groups G of order 32. There exist 51 non-isomorphic groups of order 32. In H, these groups are numbered by 1, ·s ,51. For the groups G38,·s, G41, that fit in the title, the explicit ring structure is determined in BJ. In particular, K(s)*(BG) is the quotient of a polynomial ring in 6 variables over K(s)*(pt) by an ideal generated by explicit polynomials. In this article we present some calculations using the same arguments in combination with a theorem of B0 on good groups in the sense of Hopkins-Kuhn-Ravenel. In particular, we consider the groups G36,G37, each isomorphic to a semidirect product (C4× C2× C2) C2, the group G34 (C4× C4) C2 and its non-split version G35. For these groups the action of C2 is diagonal, i.e., simpler than for the groups G38,·s, G41, however the rings K(s)*(BG) have the same complexity.