The Conway knot has infinite concordance order in the smooth concordance group.
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3 Pith papers cite this work. Polarity classification is still indexing.
fields
math.GT 3years
2026 3verdicts
UNVERDICTED 3representative citing papers
Defines concordance-invariant γ^k invariants for 3-component links that lift Milnor invariants using a new h(L) analogue of the Kojima-Yamasaki η-invariant, with applications to weak-cobordism classification and disk-bounding knots.
Establishes rank inequality for knot Floer homology of freely 2-periodic knots versus quotients using spectral sequence, with Seifert genus corollary.
citing papers explorer
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The Conway knot has infinite concordance order
The Conway knot has infinite concordance order in the smooth concordance group.
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Lifting Milnor Invariants for 3-Component Links
Defines concordance-invariant γ^k invariants for 3-component links that lift Milnor invariants using a new h(L) analogue of the Kojima-Yamasaki η-invariant, with applications to weak-cobordism classification and disk-bounding knots.
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A note on the knot Floer homology of freely 2-periodic knots and their quotients
Establishes rank inequality for knot Floer homology of freely 2-periodic knots versus quotients using spectral sequence, with Seifert genus corollary.