Gauss words and the topology of map germs from \(\mathbb{R}^3\) to \(\mathbb{R}^3\)
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Publication:888927
DOI10.4171/RMI/860zbMath1335.58024OpenAlexW2495963642MaRDI QIDQ888927
Juan Antonio Moya-Pérez, Juan Jose Nuño-Ballesteros
Publication date: 3 November 2015
Published in: Revista Matemática Iberoamericana (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.4171/rmi/860
Topological properties of mappings on manifolds (58K15) Classification; finite determinacy of map germs (58K40) Deformation of singularities (58K60)
Related Items (5)
The Reeb graph of a map germ from \(\mathbb {R}^3\) to \(\mathbb {R}^2\) with non isolated zeros ⋮ The dual tree of a fold map germ from to ⋮ The link of a frontal surface singularity ⋮ The Reeb Graph of a Map Germ from ℝ3 to ℝ2 with Isolated Zeros ⋮ Topological classification of corank 1 map germs from \(\mathbb R^3\) to \(\mathbb R^3\)
Cites Work
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- The link of a finitely determined map germ from \(R^{2}\) to \(R^{2}\)
- Topological classification of corank 1 map germs from \(\mathbb R^3\) to \(\mathbb R^3\)
- The doodle of a finitely determined map germ from \(\mathbb R^2\) to \(\mathbb R^3\)
- Local topological properties of differentiable mappings. I
- Equivalence of stable mappings between two-dimensional manifolds
- Stable maps between 2-spheres with a connected fold curve
- Finitely determined singularities of ruled surfaces in 3
- Finite Determinacy of Smooth Map-Germs
- Fold Maps from the Sphere to the Plane
- Singular Points of Complex Hypersurfaces. (AM-61)
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