73 research outputs found
On plane sextics with double singular points
We compute the fundamental groups of five maximizing sextics with double
singular points only; in four cases, the groups are as expected. The approach
used would apply to other sextics as well, given their equations.Comment: A few explanations and references adde
Projective spaces in Fermat varieties
We give a brief systematic overview of a few results concerning the
N\'eron--Severi lattices of Fermat varieties and Delsarte surfaces
Dihedral coverings of trigonal curves
We classify and study trigonal curves in Hirzebruch surfaces admitting
dihedral Galois coverings. As a consequence, we obtain certain restrictions on
the fundamental group of a plane curve~ with a singular point of
multiplicity
Fundamental groups of symmetric sextics. II
We study the moduli spaces and compute the fundamental groups of plane
sextics of torus type with the set of inner singularities or
. We also compute the fundamental groups of a number of other
sextics, both of and not of torus type. The groups found are simplest possible,
i.e., and , respectively
Zariski -plets via dessins d'enfants
We construct exponentially large collections of pairwise distinct
equisingular deformation families of irreducible plane curves sharing the same
sets of singularities. The fundamental groups of all curves constructed are
abelian.Comment: Final version accepted for publicatio
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