Motivic invariants of real polynomial functions and their Newton polyhedrons
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Publication:5360365
DOI10.1017/S030500411500064XzbMath1371.14064MaRDI QIDQ5360365
Toshizumi Fukui, Goulwen Fichou
Publication date: 28 September 2017
Published in: Mathematical Proceedings of the Cambridge Philosophical Society (Search for Journal in Brave)
Singularities in algebraic geometry (14B05) Topology of real algebraic varieties (14P25) Real-analytic sets, complex Nash functions (32C07) Nash functions and manifolds (14P20) Classification; finite determinacy of map germs (58K40)
Related Items (2)
On Grothendieck rings and algebraically constructible functions ⋮ On a motivic invariant of the arc-analytic equivalence
Cites Work
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- Blow-Nash types of simple singularities
- On classification of real singularities
- Topological invariance of weights for weighted homogeneous singularities
- Topological types of quasihomogeneous singularities in \(\mathbb{C}^2\)
- Germs of arcs on singular algebraic varieties and motivic integration
- Virtual Betti numbers of real algebraic varieties.
- Newton polyhedra and Igusa's local zeta function
- Arc spaces and Alexander invariants
- Motivic-type invariants of blow-analytic equivalence.
- Quasihomogeneous isolated singularities of hyperplanes.
- Blow-analytic equivalence of two variable real analytic function germs
- Topological Invariance of Weights for Weighted Homogeneous Isolated Singularities in C 3
- Caracteristiques D'Euler-Poincare, Fonctions Zeta Locales et Modifications Analytiques
- Motivic invariants of arc-symmetric sets and blow-Nash equivalence
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