Lena Vos scite author profile

Lena Vos

5Publications

17Citation Statements Received

84Citation Statements Given

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KU Leuven

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The monodromy conjecture for a space monomial curve with a plane semigroup

Martín-Morales¹,

Veys²,

Vos³

2021

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This article investigates the monodromy conjecture for a space monomial curve that appears as the special fiber of an equisingular family of curves with a plane branch as generic fiber. Roughly speaking, the monodromy conjecture states that every pole of the motivic, or related, Igusa zeta function induces an eigenvalue of monodromy. As the poles of the motivic zeta function associated with such a space monomial curve have been determined in earlier work, it remains to study the eigenvalues of monodromy. After reducing the problem to the curve seen as a Cartier divisor on a generic embedding surface, we construct an embedded Q-resolution of this pair and use an A'Campo formula in terms of this resolution to compute the zeta function of monodromy. Combining all results, we prove the monodromy conjecture for this class of monomial curves.

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The motivic Igusa zeta function of a space monomial curve with a plane semigroup

Mourtada

Veys

Vos

2021

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In this article, we compute the motivic Igusa zeta function of a space monomial curve that appears as the special fiber of an equisingular family whose generic fiber is a complex plane branch. To this end, we determine the irreducible components of the jet schemes of such a space monomial curve. This approach does not only yield a closed formula for the motivic zeta function, but also allows to determine its poles. We show that, while the family of the jet schemes of the fibers is not flat, the number of poles of the motivic zeta function associated with the space monomial curve is equal to the number of poles of the motivic zeta function associated with a generic curve in the family.

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The motivic Igusa zeta function of a space monomial curve with a plane semigroup

Mourtada¹,

Veys²,

Vos³

2019

Preprint

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Note on the monodromy conjecture for a space monomial curve with a plane semigroup

Martín-Morales¹,

Mourtada²,

Veys³

et al. 2020

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The monodromy conjecture for a space monomial curve with a plane semigroup

Martín-Morales¹,

Veys²,

Vos³

2019

Preprint

View full text Add to dashboard Cite

This article investigates the monodromy conjecture for a space monomial curve that appears as the special fiber of an equisingular family of curves with a plane branch as generic fiber. Roughly speaking, the monodromy conjecture states that every pole of the motivic, or related, Igusa zeta function induces an eigenvalue of monodromy. As the poles of the motivic zeta function associated with such a space monomial curve have been determined in earlier work, it remains to study the eigenvalues of monodromy. After reducing the problem to the curve seen as a Cartier divisor on a generic embedding surface, we construct an embedded Q-resolution of this situation and use an A'Campo formula in terms of this resolution to compute the zeta function of monodromy. Combining all results, we prove the monodromy conjecture for this class of monomial curves.

show abstract

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Lena Vos

The monodromy conjecture for a space monomial curve with a plane semigroup

The motivic Igusa zeta function of a space monomial curve with a plane semigroup

The motivic Igusa zeta function of a space monomial curve with a plane semigroup

Note on the monodromy conjecture for a space monomial curve with a plane semigroup

The monodromy conjecture for a space monomial curve with a plane semigroup

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