AbstractSiegel modular forms generalize the usual elliptic modular forms and show up in many parts of mathematics: algebraic geometry, number theory and even in mathematical physics. But they are difficult to construct. We show that invariant theory enables us to efficiently construct all (vector valued) Siegel modular forms of degree two and three from from certain basic modular forms provided...
SpeakerSebastien Boucksom is a French mathematician specializing in complex and non-Archimedean geometry. After defending his PhD thesis in 2002 under the supervision of Jean-Pierre Demailly, he became a CNRS Junior Researcher at the Institut de Mathematiques de Jussieu in 2003, then a CNRS Senior Researcher in 2014, first at the Ecole Polytechnique, and then at the Institut de Mathematiques de...
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