Recent Advances in Harmonic Analysis and Partial Differential Equations Conference
During May 19-22, 2025, the Department of Mathematics at Baylor University hosted the conference “Recent Advances in Harmonic Analysis and Partial Differential Equations”, organized by Fritz Gesztesy and Dorina Mitrea with funding from the National Science Foundation, the Simons Foundation, the College of Arts and Sciences at Baylor University and the Mathematics Department at Baylor University.
Celebrating the mathematical accomplishments of Marius Mitrea on the occasion of his 60th birthday, this event has brought together over 80 mathematicians from US and abroad whose areas of expertise include:
- nonlinear dispersive partial differential equations
- scattering theory
- multilinear harmonic analysis
- perturbation of elliptic operators
- elliptic, parabolic, and free boundary value problems
- singular integral operators of Calderon-Zygmund type
- spectral and operator theory
- orthogonal polynomials
- Fourier restrictions and Strichartz estimates
- pseudodifferential operators
- harmonic analysis on the Heisenberg group
Featuring 15 high profile speakers and a well-attended, dynamic poster session for junior participants, this has been a forum for a timely exchange of ideas in rapidly evolving areas of mathematics, typically requiring a multifaceted type of expertise. Fostering collaboration, exposing junior mathematicians to the latest developments, trends, and overarching directions of research, have been at the core of this conference. In his opening remarks, Associate Dean Charles Weaver has highlighted the significance of this moment, the strides made by the Mathematics Department at Baylor, and the commitment of the university to foster and support research and scholarship at the highest level.
For more details visit the conference web page.
