Using rational homology circles to construct rational homology balls
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Publication:1998822
DOI10.1016/j.topol.2021.107626zbMath1468.57013arXiv2006.14509OpenAlexW3126942892MaRDI QIDQ1998822
Publication date: 9 March 2021
Published in: Topology and its Applications (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2006.14509
plumbingsurgeryrational homology 3-spheretorus bundlerational homology 4-ballrational homology circle
Related Items (3)
A survey of the homology cobordism group ⋮ Classification of torus bundles that bound rational homology circles ⋮ Surgeries on iterated torus knots bounding rational homology 4-balls
Cites Work
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- Dehn surgeries and rational homology balls
- Lens spaces, rational balls and the ribbon conjecture
- Symplectic surgeries and normal surface singularities
- A la recherche de la topologie perdue. 1: Du côté de chez Rohlin. 2: Le côté de Casson
- Some homology lens spaces which bound rational homology balls
- Symplectic convexity in low-dimensional topology
- Rational blowdowns of smooth 4-manifolds
- Rational homology cobordisms of plumbed manifolds
- Symplectically replacing plumbings with Euler characteristic \(2 \: 4\)-manifolds
- More Brieskorn spheres bounding rational balls
- Milnor fillable contact structures are universally tight
- On Seifert fibered spaces bounding definite manifolds
- Surgery along star-shaped plumbings and exotic smooth structures on 4-manifolds
- On symplectic fillings of virtually overtwisted torus bundles
- Knot concordance and homology cobordism
- Brieskorn spheres bounding rational balls
- A Calculus for Plumbing Applied to the Topology of Complex Surface Singularities and Degenerating Complex Curves
- On rational sliceness of Miyazaki's fibered, −amphicheiral knots
- Handle decompositions of rational homology balls and Casson–Gordon invariants
- On the slice-ribbon conjecture for Montesinos knots
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