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| 1 |
I Dai, On the Pin(2)-equivariant
monopole Floer homology of plumbed 3-manifolds, Michigan Math. J. 67
(2018) 423 MR3802260 |
| 2 |
I Dai, C
Manolescu, Involutive Heegaard
Floer homology and plumbed three-manifolds, J. Inst.
Math. Jussieu 18 (2019) 1115 MR4021102 |
| 3 |
R E Gompf,
A I Stipsicz, 4-manifolds and Kirby calculus, 20,
Amer. Math. Soc. (1999) MR1707327 |
| 4 |
M Hedden, M H
Kim, T E Mark, K Park, Irreducible 3-manifolds that cannot be obtained by
0-surgery on a knot, Trans.
Amer. Math. Soc. 372 (2019) 7619 MR4029676 |
| 5 |
K Hendricks, J
Hom, M Stoffregen, I Zemke, Surgery exact
triangles in involutive Heegaard Floer homology, preprint
(2020) arXiv:2011.00113 |
| 6 |
K Hendricks, C
Manolescu, Involutive Heegaard
Floer homology, Duke Math. J. 166 (2017) 1211 MR3649355 |
| 7 |
K Hendricks, C
Manolescu, I Zemke, A connected sum
formula for involutive Heegaard Floer homology, Selecta
Math. 24 (2018) 1183 MR3782421 |
| 8 |
K Ichihara, K
Motegi, H J Song, Seifert fibered
slopes and boundary slopes on small hyperbolic knots,
Bull. Nara Univ. Ed. Natur. Sci. 57 (2008) 21 MR2499823 |
| 9 |
A Juhász, D
Thurston, I Zemke, Naturality and mapping
class groups in Heegard Floer homology, 1338, Amer.
Math. Soc. (2021) MR4337438 |
| 10 |
L Moser, Elementary surgery
along a torus knot, Pacific J. Math. 38 (1971) 737
MR383406 |
| 11 |
J Murakami,
A state
model for the multivariable Alexander polynomial,
Pacific J. Math. 157 (1993) 109 MR1197048 |
| 12 |
A Némethi, On the Ozsváth–Szabó
invariant of negative definite plumbed 3-manifolds, Geom. Topol. 9 (2005) 991
MR2140997 |
| 13 |
A Némethi, Lattice cohomology
of normal surface singularities, Publ. Res. Inst. Math.
Sci. 44 (2008) 507 MR2426357 |
| 14 |
W D Neumann,
A calculus for
plumbing applied to the topology of complex surface
singularities and degenerating complex curves, Trans.
Amer. Math. Soc. 268 (1981) 299 MR632532 |
| 15 |
P Ozsváth, A I
Stipsicz, Z Szabó, A spectral sequence on lattice
homology, Quantum Topol. 5 (2014) 487 MR3317341 |
| 16 |
P Ozsváth, Z
Szabó, Absolutely
graded Floer homologies and intersection forms for
four-manifolds with boundary, Adv. Math. 173 (2003) 179
MR1957829 |
| 17 |
P Ozsváth, Z
Szabó, On the Floer homology
of plumbed three-manifolds, Geom. Topol. 7 (2003) 185
MR1988284 |
| 18 |
P Ozsváth, Z
Szabó, Holomorphic
disks and three-manifold invariants: properties and
applications, Ann. of Math. 159 (2004) 1159 MR2113020 |
| 19 |
P Ozsváth, Z
Szabó, Holomorphic
disks and topological invariants for closed
three-manifolds, Ann. of Math. 159 (2004) 1027 MR2113019 |
| 20 |
P Ozsváth, Z
Szabó, Holomorphic
triangles and invariants for smooth four-manifolds,
Adv. Math. 202 (2006) 326 MR2222356 |
| 21 |
P Ozsváth, Z
Szabó, An
introduction to Heegaard Floer homology, from: "Floer
homology, gauge theory, and low-dimensional topology", Clay
Math. Proc. 5, Amer. Math. Soc. (2006) 3 MR2249247 |
| 22 |
P Ozsváth, Z
Szabó, Lectures
on Heegaard Floer homology, from: "Floer homology,
gauge theory, and low-dimensional topology", Clay Math. Proc.
5, Amer. Math. Soc. (2006) 29 MR2249248 |
| 23 |
R Rustamov, On
Heegaard Floer homology of plumbed three-manifolds with
b1 = 1,
preprint (2004) arXiv:math/0405118 |
| 24 |
V Turaev, Torsions of
3-dimensional manifolds,
208, Birkhäuser (2002) MR1958479 |
| 25 |
I Zemke, The
equivalence of lattice and Heegaard Floer homology,
preprint (2021) arXiv:2111.14962 |
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