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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 |
3 |
I Dai, M
Stoffregen, On homology cobordism
and local equivalence between plumbed manifolds, Geom.
Topol. 23 (2019) 865 MR3939054 |
4 |
R Fintushel,
R J Stern, Instanton homology
of Seifert fibred homology three spheres, Proc. London
Math. Soc. 61 (1990) 109 MR1051101 |
5 |
K A Frøyshov,
Equivariant
aspects of Yang–Mills Floer theory, Topology 41 (2002)
525 MR1910040 |
6 |
M Furuta, Homology cobordism group
of homology 3–spheres,
Invent. Math. 100 (1990) 339 MR1047138 |
7 |
K Hendricks, J
Hom, T Lidman, Applications of
involutive Heegaard Floer homology, J. Inst. Math.
Jussieu (2019) |
8 |
K Hendricks, C
Manolescu, Involutive Heegaard
Floer homology, Duke Math. J. 166 (2017) 1211 MR3649355 |
9 |
K Hendricks, C
Manolescu, I Zemke, A connected sum
formula for involutive Heegaard Floer homology, Selecta
Math. 24 (2018) 1183 MR3782421 |
10 |
F Lin, Pin(2)–monopole
Floer homology, higher compositions and connected sums,
J. Topol. 10 (2017) 921 MR3705144 |
11 |
F Lin, The surgery exact
triangle in Pin(2)–monopole Floer homology, Algebr.
Geom. Topol. 17 (2017) 2915 MR3704248 |
12 |
F Lin, A Morse–Bott approach to
monopole Floer homology and the triangulation
conjecture, 1221, Amer. Math. Soc. (2018) MR3827053 |
13 |
C Manolescu,
Pin(2)–equivariant
Seiberg–Witten Floer homology and the triangulation
conjecture, J. Amer. Math. Soc. 29 (2016) 147 MR3402697 |
14 |
A Némethi, Lattice cohomology
of normal surface singularities, Publ. Res. Inst. Math.
Sci. 44 (2008) 507 MR2426357 |
15 |
W D Neumann,
An invariant of
plumbed homology spheres, from: "Topology Symposium
Siegen 1979" (editors U Koschorke, W D Neumann), Lecture
Notes in Math. 788, Springer (1980) 125 MR585657 |
16 |
P Ozsváth, Z
Szabó, On the Floer homology
of plumbed three-manifolds, Geom. Topol. 7 (2003) 185
MR1988284 |
17 |
L Siebenmann,
On vanishing of
the Rohlin invariant and nonfinitely amphicheiral homology
3–spheres, from: "Topology
Symposium Siegen 1979" (editors U Koschorke, W D Neumann),
Lecture Notes in Math. 788, Springer (1980) 172 MR585660 |
18 |
M Stoffregen,
Pin(2)–equivariant Seiberg–Witten Floer homology
of Seifert fibrations, preprint (2015) arXiv:1505.03234 |
19 |
M Stoffregen,
Manolescu
invariants of connected sums, Proc. Lond. Math. Soc.
115 (2017) 1072 MR3733559 |
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