November 16, 2016
4:15 pm
-
5:15 pm
CH 240
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2016-11-16 17:15:00
2016-11-16 18:15:00
Recruitment talk -- Benjamin Jaye
Title: The Geometric Theory of Singular Integral OperatorsAbstract: Over the last thirty years, several breakthroughs have been made regarding the behavior of analytic and harmonic functions through first understanding the geometric properties of measures for which an associated singular integral operator is well behaved. In this talk, we shall introduce the central questions in the geometric theory of singular integral operators, and see how describing a certain object called a reflectionless measure can shed new light on this area. This talk is based on joint work with Fedor Nazarov, Maria Carmen Reguera, and Xavier Tolsa.
CH 240
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America/New_York
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2016-11-16 16:15:00
2016-11-16 17:15:00
Recruitment talk -- Benjamin Jaye
Title: The Geometric Theory of Singular Integral OperatorsAbstract: Over the last thirty years, several breakthroughs have been made regarding the behavior of analytic and harmonic functions through first understanding the geometric properties of measures for which an associated singular integral operator is well behaved. In this talk, we shall introduce the central questions in the geometric theory of singular integral operators, and see how describing a certain object called a reflectionless measure can shed new light on this area. This talk is based on joint work with Fedor Nazarov, Maria Carmen Reguera, and Xavier Tolsa.
CH 240
America/New_York
public
Title: The Geometric Theory of Singular Integral Operators
Abstract: Over the last thirty years, several breakthroughs have been made regarding the behavior of analytic and harmonic functions through first understanding the geometric properties of measures for which an associated singular integral operator is well behaved. In this talk, we shall introduce the central questions in the geometric theory of singular integral operators, and see how describing a certain object called a reflectionless measure can shed new light on this area. This talk is based on joint work with Fedor Nazarov, Maria Carmen Reguera, and Xavier Tolsa.
