Minimal exponents of hyperplane sections: a conjecture of Teissier
نویسندگان
چکیده
We prove a conjecture of Teissier asserting that if $f$ has an isolated singularity at $P$ and $H$ is smooth hypersurface through $P$, then $\widetilde{\alpha}\_P(f)\geq \widetilde{\alpha}\_P(f\vert\_H)+\frac{1}{\theta\_P(f)+1}$, where $\widetilde{\alpha}\_P(f)$ $\widetilde{\alpha}\_P(f\vert\_H)$ are the minimal exponents $f\vert\_H$, respectively, $\theta\_P(f)$ invariant obtained by comparing integral closures powers Jacobian ideal defining $P$. The proof builds on approaches Loeser (1984) Elduque–Mustaţă (2021). new ingredients result concerning behavior Hodge ideals with respect to finite maps about certain for families singularities constant Milnor number. In opposite direction, we show every $f$, general $\widetilde{\alpha}\_P(f)\leq \widetilde{\alpha}\_P(f\vert\_H)+\frac{1}{{\rm mult}\_P(f)}$, extending from case singularities.
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ژورنال
عنوان ژورنال: Journal of the European Mathematical Society
سال: 2022
ISSN: ['1435-9855', '1435-9863']
DOI: https://doi.org/10.4171/jems/1292