An explicit non-inductive twisting function is constructed for the twisted tensor product from any twisted cartesian product of simplicial sets by selecting a specific monoid morphism from Kan's loop group to Moore loop spaces.
Hatcher, Algebraic Topology, Cambridge University Press
3 Pith papers cite this work. Polarity classification is still indexing.
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UNVERDICTED 3representative citing papers
Proves Rudyak's conjecture that cat(M) ≥ cat(N) for any degree-one map f:M→N between oriented closed manifolds, when M and N are simply connected spin n-manifolds with n≤8.
Introduces hyperbolic Belyi maps and Shabat-Blaschke products, studies their dessins in the disk, and uses arithmetic properties of Chebyshev-Blaschke products to prove Landen-type theta function identities.
citing papers explorer
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On twisting functions in twisted cartesian products and twisted tensor products
An explicit non-inductive twisting function is constructed for the twisted tensor product from any twisted cartesian product of simplicial sets by selecting a specific monoid morphism from Kan's loop group to Moore loop spaces.
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Rudyak's conjecture for lower dimensional 1-connected manifolds
Proves Rudyak's conjecture that cat(M) ≥ cat(N) for any degree-one map f:M→N between oriented closed manifolds, when M and N are simply connected spin n-manifolds with n≤8.
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Hyberbolic Belyi maps and Shabat-Blaschke products
Introduces hyperbolic Belyi maps and Shabat-Blaschke products, studies their dessins in the disk, and uses arithmetic properties of Chebyshev-Blaschke products to prove Landen-type theta function identities.