Kubasch, Alexander A. and Némethi, András and Schefler, Gergő (2024) Multiplicity and lattice cohomology of plane curve singularities. REVUE ROUMAINE DE MATHÉMATIQUES PURES ET APPLIQUÉES / ROMANIAN JOURNAL OF PURE AND APPLIED MATHEMATICS, 69 (2). pp. 191-234. ISSN 0035-3965
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Abstract
The lattice cohomology and the graded root of an isolated curve singularity were recently introduced in [3]. The lattice cohomology is a categorification of the δ-invariant. The hope is that for plane curve singularities it encodes subtle information about the analytic structure and concrete analytic invariants. The present paper is a positive result in this direction: we prove that the multiplicity of an irreducible plane curve singularity can be recovered from its lattice cohomology (or, from its graded root). In fact, we give four distinct proofs of this statement, each of them emphasizing a rather different aspect of the theory of plane curve germs. With these proofs, we also create new bridges between the abstract analytic type and the embedded topological type of the germ. In particular, we provide a new characterization of the Ap´ery set of the semigroup of the germ in terms of embedded data.
Item Type: | Article |
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Uncontrolled Keywords: | plane curve singularity, multiplicity, analytic lattice cohomology, computation sequence, semigroup |
Subjects: | Q Science / természettudomány > QA Mathematics / matematika |
SWORD Depositor: | MTMT SWORD |
Depositing User: | MTMT SWORD |
Date Deposited: | 07 Nov 2024 15:11 |
Last Modified: | 07 Nov 2024 15:11 |
URI: | https://real.mtak.hu/id/eprint/208942 |
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