Lattice Cohomology of Normal Surface Singularities

Némethi, András

doi:10.2977/prims/1210167336

Cited by 54 publications

(156 citation statements)

References 18 publications

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“…[15,17,20] If G is a (not necessarily minimal) graph of S 3 or of a lens-space then s h (G) = 0 for every h ∈ H.…”

Section: Preliminariesmentioning

confidence: 99%

“…In this article we will involve another cohomology theory with similar property. Since S 3 −p/q (K) is representable by a negative definite plumbing graph, via [21] we view the SW invariants as Euler characteristics of lattice cohomologies introduced in [17]. The big advantage of the lattice cohomology over the classical definition of Heegaard-Floer homology is that it is computable algorithmically from the plumbing graph.…”

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confidence: 99%

“…The normalized SW invariant s h (G) can also be expressed as the Euler characteristic of the lattice cohomology. The advantage of this approach is that it provides an alternative, completely elementary way to define s, as the definition of the lattice cohomology is purely combinatorial from the plumbing graph G. We briefly recall the definition and some facts about the lattice cohomology associated with a QHS 3 3-manifold with negative definite plumbing graph G. For more see [17,26].…”

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confidence: 99%

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Seiberg–Witten Invariant of the Universal Abelian Cover of $${S_{-p/q}^{3}(K)}$$

Bodnár

Némethi

2017

Singularities and Computer Algebra

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Abstract. We prove an additivity property for the normalized Seiberg-Witten invariants with respect to the universal abelian cover of those 3-manifolds, which are obtained via negative rational Dehn surgeries along connected sum of algebraic knots. Although the statement is purely topological, we use the theory of complex singularities in several steps of the proof. This topological covering additivity property can be compared with certain analytic properties of normal surface singularities, especially with functorial behaviour of the (equivariant) geometric genus of singularities. We present several examples in order to find the validity limits of the proved property, one of them shows that the covering additivity property is not true for negative definite plumbed 3-manifolds in general.

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“…[15,17,20] If G is a (not necessarily minimal) graph of S 3 or of a lens-space then s h (G) = 0 for every h ∈ H.…”

Section: Preliminariesmentioning

confidence: 99%

mentioning

confidence: 99%

mentioning

confidence: 99%

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Seiberg–Witten Invariant of the Universal Abelian Cover of $${S_{-p/q}^{3}(K)}$$

Bodnár

Némethi

2017

Singularities and Computer Algebra

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“…The second author in [11,16] associated with such an M (and any fixed spin c -structure s of M ) a graded Z[U ]-module H * (M, s), called the lattice cohomology of M . The construction was strongly influenced by the Artin-Laufer program of normal surface singularities (targeting topological characterization of certain analytic invariants), cf.…”

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confidence: 99%

“…The construction was strongly influenced by the Artin-Laufer program of normal surface singularities (targeting topological characterization of certain analytic invariants), cf. [20,11,16], and by the work of Ozsváth and Szabó on Heegaard-Floer theory, especially [26] (see also their long list of papers in the subject).…”

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confidence: 99%

Reduction Theorem for Lattice Cohomology

Tamás¹,

Némethi²

2014

International Mathematics Research Notices

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Abstract. The lattice cohomology of a plumbed 3-manifold M associated with a connected negative definite plumbing graph is an important tool in the study of topological properties of M and in the comparison of the topological properties with analytic ones, whenever M is realized as complex analytic singularity link. By definition, its computation is based on the (Riemann-Roch) weights of the lattice points of Z s , where s is the number of vertices of the plumbing graph. The present article reduces the rank of this lattice to the number of 'bad' vertices of the graph. (Usually the geometry/topology of M is codified exactly by these 'bad' vertices via surgery or other constructions. Their number measures how far is the plumbing graph from a rational one, or, how far is M from an L-space.)The effect of the reduction appears also at the level of certain multivariable (topological Poincaré) series as well. Since from these series one can also read the Seiberg-Witten invariants, the Reduction Theorem provides new formulae for these invariants too.The reduction also implies the vanishing H q = 0 of the lattice cohomology for q ≥ ν, where ν is the number of 'bad' vertices. (This bound is sharp.)

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