Linear and bilinear restriction estimates for the Fourier transform
Temur, Faruk
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https://hdl.handle.net/2142/46569
Description
Title
Linear and bilinear restriction estimates for the Fourier transform
Author(s)
Temur, Faruk
Issue Date
2014-01-16T17:54:21Z
Director of Research (if dissertation) or Advisor (if thesis)
Erdogan, M. Burak
Doctoral Committee Chair(s)
Laugesen, Richard S.
Committee Member(s)
Erdogan, M. Burak
Rosenblatt, Joseph
Li, Xiaochun
Department of Study
Mathematics
Discipline
Mathematics
Degree Granting Institution
University of Illinois at Urbana-Champaign
Degree Name
Ph.D.
Degree Level
Dissertation
Keyword(s)
Fourier transform
Restriction theory
Wave equation
Linear restriction
Kakeya problem
Schrodinger equation
Abstract
This thesis is concerned with the restriction theory of the Fourier transform. We prove two restriction estimates for the Fourier transform. The first is a bilinear estimate for the light cone when the exponents are on a critical line. This extends results proven by Wolff, Tao and Lee-Vargas. The second result is a linear restriction estimate for surfaces with positive Gaussian curvature that improves over estimates proven by Bourgain and Guth, and gives the best known exponents for the well-known restriction conjecture for dimensions that are multiples of three.
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