CaTherine wheels unify structures across fields by providing a canonical bijection between orbit-equivalence classes of pseudo-Anosov flows without perfect fits, G-equivariant CaTherine wheels, minimal G-zippers, and connected components of uniform quasimorphisms for the fundamental group of any闭ed
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3 Pith papers cite this work. Polarity classification is still indexing.
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2026 3verdicts
UNVERDICTED 3representative citing papers
Constructs Anosov flows in circle bundles over hyperbolic 3-manifolds via Cannon-Thurston maps, yielding counterexamples to Verjovsky's conjecture with some manifolds having infinitely many up to orbit equivalence.
Veering triangulations for Anosov flows with orientable foliations admit Legendrian edge realizations in strongly adapted bicontact structures and can be placed in steady position, implying horizontal surgery correspondences via prior author result.
citing papers explorer
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CaTherine wheels
CaTherine wheels unify structures across fields by providing a canonical bijection between orbit-equivalence classes of pseudo-Anosov flows without perfect fits, G-equivariant CaTherine wheels, minimal G-zippers, and connected components of uniform quasimorphisms for the fundamental group of any闭ed
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Exotic codimension one Anosov flows
Constructs Anosov flows in circle bundles over hyperbolic 3-manifolds via Cannon-Thurston maps, yielding counterexamples to Verjovsky's conjecture with some manifolds having infinitely many up to orbit equivalence.
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Legendrian position of veering triangulations
Veering triangulations for Anosov flows with orientable foliations admit Legendrian edge realizations in strongly adapted bicontact structures and can be placed in steady position, implying horizontal surgery correspondences via prior author result.