Nodal curves old and new

59 mins 41 secs, 827.71 MB, MPEG-4 Video 640x360, 29.97 fps, 44100 Hz, 1.84 Mbits/sec

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Description:	Thomas, RPW (Imperial) Friday 11 March 2011, 15:15-16:15

Created:

2011-03-18 10:07

Collection:

Moduli Spaces

Publisher:

Isaac Newton Institute

Thomas, RPW

Language:

eng (English)

Distribution:

World

(downloadable)

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Author:	Thomas, RPW
Director:	Steve Greenham

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16:9

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Abstract:	I will describe a classical problem going back to 1848 (Steiner, Cayley, Salmon,...) and a solution using simple techniques, but techniques that one would never really have thought of without ideas coming from string theory (Gromov-Witten invariants, BPS states) and modern geometry (the Maulik-Nekrasov-Okounkov-Pandharipande conjecture). In generic families of curves C on a complex surface S, nodal curves -- those with the simplest possible singularities -- appear in codimension 1. More generally those with d nodes occur in codimension d. In particular a d-dimensional linear family of curves should contain a finite number of such d-nodal curves. The classical problem -- at least in the case of S being the projective plane -- is to determine this number. The Göttsche conjecture states that the answer should be topological, given by a universal degree d polynomial in the four numbers C.C, c_1(S).C, c_1(S)^2 and c_2(S). There are now proofs in various settings; a completely algebraic proof was found recently by Tzeng. I will explain a simpler approach which is joint work with Martijn Kool and Vivek Shende.

Abstract:

I will describe a classical problem going back to 1848 (Steiner, Cayley, Salmon,...) and a solution using simple techniques, but techniques that one would never really have thought of without ideas coming from string theory (Gromov-Witten invariants, BPS states) and modern geometry (the Maulik-Nekrasov-Okounkov-Pandharipande conjecture). In generic families of curves C on a complex surface S, nodal curves -- those with the simplest possible singularities -- appear in codimension 1. More generally those with d nodes occur in codimension d. In particular a d-dimensional linear family of curves should contain a finite number of such d-nodal curves. The classical problem -- at least in the case of S being the projective plane -- is to determine this number. The Göttsche conjecture states that the answer should be topological, given by a universal degree d polynomial in the four numbers C.C, c_1(S).C, c_1(S)^2 and c_2(S). There are now proofs in various settings; a completely algebraic proof was found recently by Tzeng. I will explain a simpler approach which is joint work with Martijn Kool and Vivek Shende.

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Nodal curves old and new