Comparison of Motivic Homotopy Theories
Abstract
We construct a comparison functor from the dual category of motivic homotopy category SH to the category of A1-invariant localizing motives MotlocA1 in the sense of Blumberg, Gepner and Tabuada (with A1-invariance imposed). We as well construct its non-A1-invariant analogue: a functor from the dual category of Annala-Iwasa-Hoyois's non-A1-invariant motivic homotopy category MS to Motloc. After the Barr-Beck argument, these functors factor through categories of modules over a dual version of (A1-invariant) K-theory spectrum KGL(A1). Over a field that admits resolution of singularities, we show that the A1-invariant factored functor is fully-faithful, while the non-A1-invariant one is not in general.
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