比利时vs摩洛哥足彩
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university of california san diego
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math 208 - algebraic geometry seminar
pierrick bousseau
eth zurich
quasimodular forms from betti numbers
abstract:
this talk will be about refined curve counting on local $p^2$, the noncompact calabi-yau 3-fold total space of the canonical line bundle of the projective plane. i will explain how to construct quasimodular forms starting from betti numbers of moduli spaces of one-dimensional coherent sheaves on $p^2$. this gives a proof of some stringy predictions about the refined topological string theory of local $p^2$ in the nekrasov-shatashvili limit. this work is in part joint with honglu fan, shuai guo, and longting wu.
host: dragos oprea
may 15, 2020
9:00 am
zoom (contact james mckernan)
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