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Amelotte, S · 2024 · DOI 10.1007/978-3-031-57204-3

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Homotopy exponents of polyhedral products

math.AT · 2026-05-09 · unverdicted · novelty 7.0

For polyhedral products (CA, A)^K with finite A_i of torsion-free homology, rational hyperbolicity implies no homotopy exponent at odd primes, and Moore's conjecture holds if suspensions of A_i are wedges of spheres; criteria are given for hyperbolicity in polyhedral joins.

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Homotopy exponents of polyhedral products math.AT · 2026-05-09 · unverdicted · none · ref 15
For polyhedral products (CA, A)^K with finite A_i of torsion-free homology, rational hyperbolicity implies no homotopy exponent at odd primes, and Moore's conjecture holds if suspensions of A_i are wedges of spheres; criteria are given for hyperbolicity in polyhedral joins.

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