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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Pith papers citing it
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math.GT 3years
2026 3verdicts
UNVERDICTED 3representative citing papers
Nontrivial elements in the group action on a minimal zipper fix a unique point in each tree or act freely, answering Calegari-Loukidou and implying an element with one fixed point per tree.
For an Anosov foliation with branching on a hyperbolic manifold, the leftmost universal circle admits a Cannon-Thurston map to the ideal 2-sphere, implying pseudo-Anosov action by the fundamental group.
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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Eclipses on Zippers
Nontrivial elements in the group action on a minimal zipper fix a unique point in each tree or act freely, answering Calegari-Loukidou and implying an element with one fixed point per tree.
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Cannon--Thurston maps for Anosov foliations
For an Anosov foliation with branching on a hyperbolic manifold, the leftmost universal circle admits a Cannon-Thurston map to the ideal 2-sphere, implying pseudo-Anosov action by the fundamental group.