Abstract
In this paper, we consider curves of degree 10 of torus type (2,5), $C:=\{f_5(x,y)^2+f_2(x,y)^5=0\}$. Assume that $f_2(0,0)=f_5(0,0)=0$. Then $O=(0,0)$ is a singular point of $C$ which is called an inner singularity. In this paper, we give a topological classification of singularities of $(C,O)$.
Citation
Masayuki KAWASHIMA. "Classification of Local Singularities on Torus Curves of Type $(2,5)$." Tokyo J. Math. 32 (2) 313 - 348, December 2009. https://doi.org/10.3836/tjm/1264170235
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