Plane curves and their fundamental groups: Generalizations of Uludağ's construction
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Publication:1408558
DOI10.2140/agt.2003.3.593zbMath1053.14027arXivmath/0207131OpenAlexW3102141558MaRDI QIDQ1408558
Publication date: 24 September 2003
Published in: Algebraic \& Geometric Topology (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/math/0207131
Extensions, wreath products, and other compositions of groups (20E22) Coverings of curves, fundamental group (14H30)
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- Fundamental groups of tangent conic-line arrangements with singularities up to order 6
- Zariski pairs, fundamental groups and Alexander polynomials
- Flex curves and their applications
- Some examples of Zariski pairs arising from certain elliptic K3 surfaces. II: Degtyarev's conjecture
- Fundamental group of a class of rational cuspidal curves
- Some examples of Zariski pairs arising from certain elliptic \(K3\) surfaces
- A new Alexander-equivalent Zariski pair.
- A remark on Artal's paper
- The fundamental group of the complement of a union of complex hyperplanes
- \(\pi_{1}\)-classification of real arrangements with up to eight lines
- Fundamental groups of complements to singular plane curves
- On rational surfaces I. Irreducible curves of arithmetic genus $0$ or $1$
- Zariski Pairs of Index 19 and Mordell-Weil Groups of K 3 Surfaces
- On Chisini's conjecture
- Braid monodromy factorizations and diffeomorphism types
- BRAID MONODROMY OF SPECIAL CURVES
- SEXTICS WITH SINGULAR POINTS IN SPECIAL POSITION
- On the Fundamental Group of an Algebraic Curve
- Rational cuspidal plane curves of type (d, d-3)
- A note on Zariski pairs
- The Topological Discriminant Group of a Riemann Surface of Genus p
- More Zariski pairs and finite fundamental groups of curve complements
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