Loc H. Nguyen
Orcid: 0000-0002-0172-8816
According to our database1,
Loc H. Nguyen
authored at least 37 papers
between 2017 and 2024.
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Bibliography
2024
The Fourier-based dimensional reduction method for solving a nonlinear inverse heat conduction problem with limited boundary data.
Commun. Nonlinear Sci. Numer. Simul., January, 2024
The Carleman-Newton method to globally reconstruct the initial condition for nonlinear parabolic equations.
J. Comput. Appl. Math., 2024
A robust approach with numerical demonstrations for the inverse scattering problem using a Carleman contraction map.
CoRR, 2024
The time dimensional reduction method to determine the initial conditions without the knowledge of damping coefficients.
Comput. Math. Appl., 2024
Comput. Math. Appl., 2024
2023
Convexification Numerical Method for a Coefficient Inverse Problem for the Riemannian Radiative Transfer Equation.
SIAM J. Imaging Sci., September, 2023
Convexification Numerical Method for a Coefficient Inverse Problem for the Radiative Transport Equation.
SIAM J. Imaging Sci., March, 2023
A Carleman-Picard approach for reconstructing zero-order coefficients in parabolic equations with limited data.
CoRR, 2023
Numerical verification of the convexification method for a frequency-dependent inverse scattering problem with experimental data.
CoRR, 2023
The dimensional reduction method for solving a nonlinear inverse heat conduction problem with limited boundary data.
CoRR, 2023
2022
The Gradient Descent Method for the Convexification to Solve Boundary Value Problems of Quasi-Linear PDEs and a Coefficient Inverse Problem.
J. Sci. Comput., 2022
Numerical viscosity solutions to Hamilton-Jacobi equations via a Carleman estimate and the convexification method.
J. Comput. Phys., 2022
CoRR, 2022
Convexification for a CIP for the RTE]{Convexification Numerical Method for a Coefficient Inverse Problem for the Radiative Transport Equation.
CoRR, 2022
The Carleman convexification method for Hamilton-Jacobi equations on the whole space.
CoRR, 2022
Numerical reconstruction for 3D nonlinear SAR imaging via a version of the convexification method.
CoRR, 2022
The Carleman-based contraction principle to reconstruct the potential of nonlinear hyperbolic equations.
Comput. Math. Appl., 2022
A Carleman-based numerical method for quasilinear elliptic equations with over-determined boundary data and applications.
Comput. Math. Appl., 2022
2021
The Quasi-reversibility Method to Numerically Solve an Inverse Source Problem for Hyperbolic Equations.
J. Sci. Comput., 2021
Carleman contraction mapping for a 1D inverse scattering problem with experimental time-dependent data.
CoRR, 2021
Carleman estimates and the contraction principle for an inverse source problem for nonlinear hyperbolic equation.
CoRR, 2021
Convexification-based globally convergent numerical method for a 1D coefficient inverse problem with experimental data.
CoRR, 2021
Convexification inversion method for nonlinear SAR imaging with experimentally collected data.
CoRR, 2021
2020
Numerical Solution of a Linearized Travel Time Tomography Problem With Incomplete Data.
SIAM J. Sci. Comput., 2020
Convexification for a Three-Dimensional Inverse Scattering Problem with the Moving Point Source.
SIAM J. Imaging Sci., 2020
An inverse problem of a simultaneous reconstruction of the dielectric constant and conductivity from experimental backscattering data.
CoRR, 2020
Convexification and experimental data for a 3D inverse scattering problem with the moving point source.
CoRR, 2020
Convexification for a 1D Hyperbolic Coefficient Inverse Problem with Single Measurement Data.
CoRR, 2020
A new algorithm to determine the creation or depletion term of parabolic equations from boundary measurements.
Comput. Math. Appl., 2020
2019
On an Inverse Source Problem for the Full Radiative Transfer Equation with Incomplete Data.
SIAM J. Sci. Comput., 2019
A Coefficient Inverse Problem with a Single Measurement of Phaseless Scattering Data.
SIAM J. Appl. Math., 2019
CoRR, 2019
Convergent numerical method for a linearized travel time tomography problem with incomplete data.
CoRR, 2019
2018
A Numerical Method to Solve a Phaseless Coefficient Inverse Problem from a Single Measurement of Experimental Data.
SIAM J. Imaging Sci., 2018
2017
Numerical solution of a coefficient inverse problem with multi-frequency experimental raw data by a globally convergent algorithm.
J. Comput. Phys., 2017