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VERSION:2.0
BEGIN:VEVENT
DTSTART:20180517T154500
DTEND:20180517T170000
DTSTAMP:20190424T023033
SUMMARY:Colloquium van der Geer
DESCRIPTION: Algebraic Curves and Modular Forms of Low Genus\n Modular forms play an important role in number theory and algebraic geometry. Ellipticmodular forms are well-known, but Siegel modular forms of higher genus are much harderto construct. For genus 2 and 3 modular forms are intimately connected with the moduli ofcurves of genus 2 and 3. We give an explicit way to describe such modular forms for genus2 and 3 using invariant theory and give some applications. This is based on joint work withFabien Clery and Carel Faber.\n \nSpeaker: Gerard van der Geer (VU Amsterdam)
UID:UL-118397
LOCATION:Maison du Nombre
Room 1.040
URL:https://www.uni.lu/recherche/fstc/mathematics_research_unit/news/colloquium_van_der_geer
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