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Filtered lattice homology of curve singularities

Published 24 Jun 2023 in math.AG | (2306.13889v2)

Abstract: Let $(C,o)$ be a complex analytic isolated curve singularity of arbitrary large embedded dimension. Its lattice cohomology ${\mathbb H}*=\oplus_{q\geq 0}{\mathbb H}q$ was introduced by \'Agoston and the author, each ${\mathbb H}q$ is a graded ${\mathbb Z}[U]$--module. Here we study its homological version ${\mathbb H}*(C,o)=\oplus{q\geq 0}{\mathbb H}q$. The construction uses the multivariable Hilbert function associated with the valuations provided by the normalization of the curve. A key intermediate product is a tower of spaces ${S_n}{n\in {\mathbb Z}}$ such that ${\mathbb H}_q=\oplus_n H_q(S_n,{\mathbb Z})$. In this article for every $n$ we consider a natural filtration of the space $S_n$, which provides a homological spectral sequence converging to the homogeneous summand $H_q(S_n,{\mathbb Z})$ of the lattice homology. All the entries of all the pages of the spectral sequences are new invariants of $(C,o)$. We show how the collection of the first pages is equivalent with the motivic Poincar\'e series of $(C,o)$.We provide several concrete computations of the corresponding multivariable Poincar\'e series associated with the entries of the spectral sequences. In the case of plane curve singularities, the first page can also be identified with the Heegaard Floer Link homology of the link of the singularity. In this way, the new invariants provide for an arbitrary (non necessarily plane) singularity a homological theory which is the analogue of the Heegaard Floer Link theory for links of plane curve singularities.

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