MML ≅ MSL ⊕ Σ^{2,1} MGL after fixing a retraction, enabling computations of low Milnor-Witt stems, geometric diagonal, slices, and 2-inverted modules over MML.
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3 Pith papers cite this work. Polarity classification is still indexing.
3
Pith papers citing it
years
2026 3verdicts
UNVERDICTED 3representative citing papers
Birational localization of motivic spaces over perfect fields is equivalent to S^{2,1}-nullification, making π0^{b A^1} a birational invariant for proper schemes.
Computes slices of MSL[e^{-1}] in terms of the second page of the ANSS for MSU and derives low Milnor-Witt stems of its homotopy via the slice spectral sequence.
citing papers explorer
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On the metalinear algebraic cobordism spectrum
MML ≅ MSL ⊕ Σ^{2,1} MGL after fixing a retraction, enabling computations of low Milnor-Witt stems, geometric diagonal, slices, and 2-inverted modules over MML.
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Birational Algebraic Topology
Birational localization of motivic spaces over perfect fields is equivalent to S^{2,1}-nullification, making π0^{b A^1} a birational invariant for proper schemes.
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Slices of the special linear algebraic cobordism spectrum
Computes slices of MSL[e^{-1}] in terms of the second page of the ANSS for MSU and derives low Milnor-Witt stems of its homotopy via the slice spectral sequence.