Talks
A convexification approach for the 3D inverse scattering problem with experimental data, AMS 2024 Spring Southeastern Sectional Meeting, Florida State University, Tallahassee, FL, 2024.
A Global Convergent Numerical Method Based on A Carleman Estimate and The Contraction Mapping Principle for Solving An Inverse Scattering Problem in The Time Domain with Experimental Data, SEARCDE 2023, Florida A&M University, Tallahassee, FL, 2023.
A Carleman-based numerical method for solving a 3D coefficient inverse problem, AMS Fall Eastern Sectional Meeting, University at Buffalo (SUNY), Buffalo, NY, September 2023.
A globally convergent numerical method for solving a coefficient inverse problem for a hyperbolic equation with experimental data, 2023 UNC Greensboro PDE Conference, Greensboro, NC, June 2023.
Global reconstruction of initial conditions for nonlinear parabolic equations via the Carleman-contraction method, MS3: Recent Advances Differential Equations and Applications, SIAM Southeastern Atlantic Section Annual Meeting, Virginia Tech, Blacksburg, VA, March 2023.
Convexification-based globally convergent numerical method for a 3D coefficient inverse problem, Special Session on Recent Developments on Analysis and Computation for Inverse Problems for PDEs, AMS Spring Southeastern Sectional Meeting, Georgia Institute of Technology, Atlanta, GA, March 2023.
Convexification method for the 3D inverse scattering problem in the frequency domain, Third Conference on Analysis and Applied Mathematics (CAAM 3), Saigon University, Ho Chi Minh City, Vietnam, December 2022.
The Carleman contraction mapping method for the 1D inverse scattering problem in the time domain with experimental data, International Conference on Differential Equations and Applications, Hanoi, Vietnam, August 2022.
A new Carleman estimate and the contraction principle for the 1D inverse scattering problem with experimental data, Workshop on PDE and related topics, VIASM, Hanoi, Vietnam, July 2022.
Carleman Contraction Mapping for a 1D Inverse Scattering Problem with Experimental Time-Dependent Data, MS137 - Recent Developments in Inverse Problems for Partial Differential Equations, SIAM Conference on Imaging Science (IS22), 2022.
A Carleman-based reconstruction method for a 1D coefficient inverse problem with time-dependent experimental data, Special Session on Recent Advances in Inverse Problems for PDEs II, AMS Fall Western Sectional Meeting, October 23, 2021.
Convexification-based globally convergent numerical method for a 1D coefficient inverse problem with experimental data, MS6 - Recent Developments on Partial Differential Equations and Applications, SIAM Southeastern Atlantic Section Conference, Auburn University, Auburn, Alabama, September 19, 2021.
Reconstructing the initial condition of quasi-linear parabolic equations from lateral Cauchy data, SS 3A – Special Session on Recent Developments on Analysis and Computation for Inverse Problems for PDEs, AMS Spring Southeastern Virtual Sectional Meeting, March 14, 2021.
The convexifcation method for systems of quasi-linear partial differential equations and its application to a coefficient inverse problem, Applied Math Seminar, Kansas State University, Manhattan, Kansas State, December 2020.
A convergent numerical method to reconstruct the initial condition of nonlinear parabolic equations from lateral Cauchy data, The October Math Day Symposium, University of North Carolina at Charlotte, Charlotte, North Carolina, Oct 24, 2020.
A convergent numerical method to reconstruct the initial condition of nonlinear parabolic equations from lateral Cauchy data, The 15th UNCG Regional Mathematics and Statistics Conference, Greensboro, North Carolina, November 2019.