I will present some recent progress in an ongoing project with S. Buschenhenke (Kiel), I. Ikromov (Samarkand) and D. Müller (Kiel) where we obtain the range of $p$ for which the maximal operator associated to hypersurfaces in $R^3$ is bounded on $L^p$. We will see, with a particular example, how, when the so-called height is less than $2$, it is not what determines the $p$ range.
On maximal functions associated to hypersurfaces in R^3 with height less than 2
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Nom de l'orateur
Spyridon Dendrinos
Etablissement de l'orateur
University College Cork
Date et heure de l'exposé
Lieu de l'exposé
Salle des séminaires