Mathematics
Location
East Ballroom
Start Date
31-3-2016 2:00 PM
End Date
31-3-2016 3:00 PM
Session
Workshop
Abstract
Dr. Laura De Carli works in harmonic analysis and functional analysis. Her research interests include: Bases and frames in Hilbert spaces, Weighted Inequalities for the Fourier transform, Unique continuation properties of solutions of elliptic equations, Restriction properties of the Fourier transform, Uniform estimates of orthogonal polynomials and special functions.
- David Harper (Laura De Carli) “On the Symmetries of Second Order PDEs”
- Alberto Mizrahi (Laura De Carli) “Exponential Riesz Bases on Triangular Domains”
File Type
Event
Mathematics
East Ballroom
Dr. Laura De Carli works in harmonic analysis and functional analysis. Her research interests include: Bases and frames in Hilbert spaces, Weighted Inequalities for the Fourier transform, Unique continuation properties of solutions of elliptic equations, Restriction properties of the Fourier transform, Uniform estimates of orthogonal polynomials and special functions.
- David Harper (Laura De Carli) “On the Symmetries of Second Order PDEs”
- Alberto Mizrahi (Laura De Carli) “Exponential Riesz Bases on Triangular Domains”
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