The Conway knot has infinite concordance order in the smooth concordance group.
Absolutely graded
4 Pith papers cite this work. Polarity classification is still indexing.
fields
math.GT 4years
2026 4verdicts
UNVERDICTED 4representative citing papers
The unknotting number of knot 11n102 is proven to be exactly 2.
Constructs multi-framed real monopole Floer homology for 3-manifolds with involutions and defines Z-valued invariants for 4-manifolds with involutions.
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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The unknotting number of 11n102 is 2
The unknotting number of knot 11n102 is proven to be exactly 2.
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Multi-framed real monopole Floer theory
Constructs multi-framed real monopole Floer homology for 3-manifolds with involutions and defines Z-valued invariants for 4-manifolds with involutions.
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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.