Two-Dimensional Quasihomogeneous Isolated Singularities with Geometric Genus Equal to Two
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概要
著者
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Ohyanagi Shigeki
Institute Of Mathematics Faculty Of Science University Of Tsukuba
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YOSHINAGA Etsuo
Department of Mathematics, Faculty of Education, Yokohama National University
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Yoshinaga Etsuo
Department Of Mathematics Faculty Of Education Yokohama National University
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Ohyanagi Shigeki
Institute of Mathematics, Faculty of Science, University of Tsukuba
関連論文
- Two-Dimensional Quasihomogeneous Isolated Singularities with Geometric Genus Equal to Two
- On Unweighted Dual Graphs for Normal Surface Singularities
- Remarks on Maximally Elliptic Singularities
- The modified analytic trivialization of real analytic families via blowing-ups
- On the Topological Types of Singularities of Brieskorn-Pham Type
- Topological types of isolated singularities defined by weighted homogeneous polynomials
- A Criterion for 2-dimensional Normal Singularities to be weakly Elliptic
- On the Geometric Genus and the Inner Modality of Quasihomogeneous Isolated Singularities
- Some Examples of Weakly Ellipitic Singularities
- Two-Dimensional Quasihomogeneous Singularities of p_g=3
- Differentiable odd functions
- Dynkin Diagrams for Singularities of Plane Curves