Discriminant of a Germ Φ: (C2 , 0)→(C2 , 0) and Seifert Fibred Manifolds
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Publication:4265409
DOI10.1112/S0024610798006887zbMath0941.58027MaRDI QIDQ4265409
Publication date: 1 August 2000
Published in: Journal of the London Mathematical Society (Search for Journal in Brave)
polar quotientsplane curvesdiscriminant curvelinking numbersWaldhausen decompositionJacobian locusMilnor isotopySeifert fibres
Jacobian problem (14R15) Topological invariants on manifolds (58K65) Topological aspects of complex singularities: Lefschetz theorems, topological classification, invariants (32S50)
Related Items (10)
Fibrations associated with a pencil of plane curves ⋮ Jacobian quotients, an algebraic proof ⋮ Jacobian quotients of polynomial mappings. ⋮ Fibred multilinks and singularities \(f\bar g\) ⋮ REAL ANALYTIC GERMS $f \bar{g}$ AND OPEN-BOOK DECOMPOSITIONS OF THE 3-SPHERE ⋮ Topological invariants of higher order for a pair of plane curve germs ⋮ Characterization of Jacobian Newton polygons of plane branches and new criteria of irreducibility ⋮ On the growth behaviour of Hironaka quotients ⋮ On the topology of the image by a morphism of plane curve singularities ⋮ Discriminant of a germ \((g,f): (\mathbb{C}^2,0)\to (\mathbb{C}^2,0)\) and contact quotients in the resolution of \(f\cdot g\)
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