Matches in DBpedia 2014 for { ?s ?p In algebraic geometry, the Zeuthen–Segre invariant I is an invariant of complex projective surfaces, introduced by Zeuthen (1871) and rediscovered by Corrado Segre (1896). The invariant I is defined to be d – 4g – b if the surface has a pencil of curves, non-singular of genus g except for d curves with 1 ordinary node, and with b base points where the curves are non-singular and transverse. Alexander (1914) showed that the Zeuthen–Segre invariant I is χ–4, where χ is the topological Euler–Poincaré characteristic introduced by Poincaré (1895), which is equal to the Chern number c2 of the surface.. }
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- Zeuthen–Segre_invariant abstract "In algebraic geometry, the Zeuthen–Segre invariant I is an invariant of complex projective surfaces, introduced by Zeuthen (1871) and rediscovered by Corrado Segre (1896). The invariant I is defined to be d – 4g – b if the surface has a pencil of curves, non-singular of genus g except for d curves with 1 ordinary node, and with b base points where the curves are non-singular and transverse. Alexander (1914) showed that the Zeuthen–Segre invariant I is χ–4, where χ is the topological Euler–Poincaré characteristic introduced by Poincaré (1895), which is equal to the Chern number c2 of the surface.".