The BP<n> cohomology of elementary abelian groups

Abstract

In this paper we study E*BVk, where E=BP<m,n> is a cohomology theory with coefficient ring Fp[vm,...,vn] (if m>0) or Z(p)[v1,...,vn] (if m=0). We use ideas from the theory of multiple level structures, developed in earlier work of the author with John Greenlees. Our results apply when k is less than or equal to w=n+1-m. If k<w we find that E*BVk has no vm-torsion. When k=w, we show that the vm-torsion is annihilated by the ideal In+1=(vm,...,vn), and that it is a free module on one generator over the ring Fp[[x0,...,xw-1]]. We give three very different formulae for this generator; it is not at all obvious that these give the same element, and we only have a rather indirect proof of this.

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