Construction of the motivic cellular spectrum KO^(geo) over Spec(mathbb{Z})
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math.AG
math.ATmath.KT
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spectrummathbfcellularconstructedmathbbmotivicspecback
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We construct a periodic motivic spectrum over $Spec(\mathbb{Z})$ which when pulled back to any scheme $S$ with $\frac{1}{2}\in\Gamma(S,\mathcal{O}_S)$ is the $HP^1-$spectrum constructed by Panin and Walter. This spectrum $\mathbf{KO}^{geo}$ is constructed using closed subschemes of the Grassmannians $Gr(r,n)$. Using this we show that $\mathbf{KO}^{geo}$ is cellular.
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