All extensions of $C_2$ by $C_{2^{n+1}}\times C_{2^{n+1}}$ are good

Malkhaz Bakuradze

All extensions of C2 by C2n+1× C2n+1 are good

Abstract

Let Cm be a cyclic group of order m. We prove that if the group G fits into an extension 1 C2n+12 G C2 1 then G is good in the sense of Hopkins-Kuhn-Ravenel, i.e., K(s)*(BG) is evenly generated by transfers of Euler classes of complex representations of subgroups of G. Previously this fact was known for n=1.

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