Spectra of BP-linear relations, -series, and BP cohomology of Eilenberg-Mac Lane spaces |
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Authors: | Hirotaka Tamanoi |
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Institution: | Department of Mathematics, University of California at Santa Cruz, Santa Cruz, California 95064 |
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Abstract: | On Brown-Peterson cohomology groups of a space, we introduce a natural inherent topology, BP topology, which is always complete Hausdorff for any space. We then construct a spectra map which calculates infinite BP-linear sums convergent with respect to the BP topology, and a spectrum which describes infinite sum BP-linear relations in BP cohomology. The mod cohomology of this spectrum is a cyclic module over the Steenrod algebra with relations generated by products of exactly two Milnor primitives. We show a close relationship between BP-linear relations in BP cohomology and the action of the Milnor primitives on mod cohomology. We prove main relations in the BP cohomology of Eilenberg-Mac Lane spaces. These are infinite sum BP-linear relations convergent with respect to the BP topology. Using BP fundamental classes, we define -series which are -analogues of the -series. Finally, we show that the above main relations come from the -series. |
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Keywords: | Brown-Peterson (co)homology theory BP fundamental class BP topology Eilenberg--Mac Lane spaces Milnor primitives $\Omega $-spectrum Steenrod algebra Sullivan exact sequence $v_{n}$-series |
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