Harmonic Analysis and Geometric Measure Theory
Org: Sean Douglas, Caleb Marshall et Yuveshen Mooroogen (University of British Columbia)
- BODAN ARSOVSKI, IAS
- ARPAD BENYI, Western Washington University
- DMITRIY BILYK, University of Minnesota
- TAINARA BORGES, Brown University
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- PAIGE BRIGHT, University of British Columbia
- RYAN BUSHLING, University of Washington
- EMILY CASEY, University of Washington
- ALEX COHEN, Massachusetts Institute of Technology
- ANGEL CRUZ, University of British Columbia
- JACOB DENSON, University of Wisconsin--Madison
- MEET FOR GROUP DINNER
- XIUMIN DU, Northwestern University
- IZABELLA ŁABA, University of British Columbia
- AKOS MAGYAR, University of Georgia
- MALABIKA PRAMANIK, University of British Columbia
- K.S. SENTHIL RAANI, Indian Institute of Science Education and Research
- SHAHABODDIN SHAABANI, Concordia University
- PABLO SHMERKIN, University of British Columbia
- KRYSTAL TAYLOR, Ohio State University
- RODOLFO TORRES, University of California, Riverside
EXTRAPOLATION OF COMPACTNESS FOR CERTAIN PSEUDODIFFERENTIAL OPERATORS [PDF]
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The extrapolation result of Rubio de Francia has become a powerful tool to extend the weighted boundedness of an operator from a particular weighted Lebesgue space into others. This classical theorem has been extended to many contexts over the years and found many useful application and, more recently, versions to extrapolate compactness have been studied by several authors too. We will provide a simple alternative version of such extrapolation of compactness results and present a novel application to a class of pseudodifferential operators, establishing their compactness on weighted Lebesgue spaces. This is joint work with María Jesús Carro and Javier Soria.
- IGANCIO URIARTE-TURO, University of Toronto
- ALEXIA YAVICOLI, University of British Columbia
- JOSH ZAHL, University of British Columbia
- JUNQIANG ZHANG, China University of Mining and Technology
- JUNJIE ZHU, University of British Columbia