On irreducible sextics with non-abelian fundamental group
classification
🧮 math.AG
keywords
fundamentalgroupsirreduciblesexticsadmitcalculatedihedralfinite
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We calculate the fundamental groups $\pi=\pi_1(P^2\setminus B)$ for all irreducible plane sextics $B\subset\P^2$ with simple singularities for which $\pi$ is known to admit a dihedral quotient $D_{10}$. All groups found are shown to be finite, two of them being of large order: 960 and 21600.
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