General formulas for motivic and topological zeta functions of arbitrary suspensions prove holomorphy and monodromy conjectures for plane curve and Lê-Yomdin singularities.
London Math
2 Pith papers cite this work. Polarity classification is still indexing.
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Proves containment of poles of motivic zeta functions under finite morphisms of normal surfaces, with equality shown for certain abelian quotient maps.
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Denef-Loeser zeta functions of suspensions and L\^e-Yomdin singularities
General formulas for motivic and topological zeta functions of arbitrary suspensions prove holomorphy and monodromy conjectures for plane curve and Lê-Yomdin singularities.
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On the poles of zeta functions for finite morphisms between normal surfaces
Proves containment of poles of motivic zeta functions under finite morphisms of normal surfaces, with equality shown for certain abelian quotient maps.