The polylogarithm motive over S = P^1 minus {0,1,∞} is realized as the relative cohomology motive of the complement of the hypersurface {1 - z t1⋯tn = 0} in A^n_S relative to the hyperplanes ti=0 and ti=1.
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4 Pith papers cite this work. Polarity classification is still indexing.
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UNVERDICTED 4representative citing papers
The condensed fundamental group of Spec(Z) is non-trivial, hence Spec(Z) is not condensed contractible.
Summarizes four constructions of commutative factorization sheaves of categories on the Ran space, generalizes the Drinfeld-Plücker formalism, and relates Satake functors for the Ran space with those for the configuration space of colored divisors on a curve.
Shape theory for condensed anima recovers classical shape for paracompact compactly generated and locally contractible spaces while extending sheaf-condensed cohomology comparisons.
citing papers explorer
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A construction of the polylogarithm motive
The polylogarithm motive over S = P^1 minus {0,1,∞} is realized as the relative cohomology motive of the complement of the hypersurface {1 - z t1⋯tn = 0} in A^n_S relative to the hyperplanes ti=0 and ti=1.
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On Galois categories and condensed contractible schemes
The condensed fundamental group of Spec(Z) is non-trivial, hence Spec(Z) is not condensed contractible.
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Note on factorization categories
Summarizes four constructions of commutative factorization sheaves of categories on the Ran space, generalizes the Drinfeld-Plücker formalism, and relates Satake functors for the Ran space with those for the configuration space of colored divisors on a curve.
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Shape theory for condensed anima
Shape theory for condensed anima recovers classical shape for paracompact compactly generated and locally contractible spaces while extending sheaf-condensed cohomology comparisons.