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Young Women in Harmonic Analysis and PDE
December 2-4, 2016
Kristina Ana Škreb (University of Zagreb)
Bellman functions and $L^p$ estimates for paraproducts
We regard dyadic paraproducts as trilinear forms. Even though they are well-known to satisfy $L^p$ estimates in the whole Banach range of exponents, one might want to give a direct proof or study the behavior of the constants. We find an explicit formula for one possible Bellman function associated with the $L^p$ boundedness of dyadic paraproducts in the spirit of the Bellman function by Nazarov, Treil, and Volberg. Then we apply the same Bellman function in various other settings, to give self-contained alternative proofs of the estimates for several classical operators. These include the martingale paraproducts of Bañuelos and Bennett and the paraproducts with respect to the heat flows. This is a joint work with Vjekoslav Kovač (University of Zagreb).
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Ausschreibung: W2-Professur Reine Mathematik (Bewerbungsschluss: 31. Juli 2019)
Prof. Jan Schröer erhält Lehrpreis der Fakultät 2018; Sonderpreis für Dr. Antje Kiesel
Prof. Peter Scholze erhält Fields-Medaille 2018
Bonner Mathematik weiterhin exzellent
Prof. Stefan Schwede zum Fellow of the AMS gewählt
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Prof. Peter Scholze erhält den Gottfried Wilhelm Leibniz-Preis 2016