Decouplings for Surfaces of Zero Curvature

Published 19 Aug 2019 in math.CA | (1908.07002v2)

Abstract: We extend the $l^{2(L^p)$} decoupling theorem of Bourgain-Demeter to the full class of developable surfaces in $\mathbb{R}^3$. This completes the $l^2$ decoupling theory of the zero Gaussian curvature surfaces that lack planar (or umbilic) points. Of central interest to our study is the tangent surface associated to the moment curve.

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Dominique Kemp

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