Julius Fergy T. Rabago
Orcid: 0000-0003-0971-6307Affiliations:
- Kanazawa University, Faculty of Mathematics and Physics, Institute of Science and Engineering, Japan
According to our database1,
Julius Fergy T. Rabago authored at least 15 papers
between 2020 and 2026.
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Bibliography
2026
Enhanced Shape Recovery in Advection-Diffusion Problems Via a Novel ADMM-Based CCBM Optimization.
J. Optim. Theory Appl., May, 2026
Cavity shape reconstruction with a homogeneous Robin condition via a constrained coupled complex boundary method with ADMM.
CoRR, May, 2026
Statistical Topological Gradient and Shape Optimization for Robust Metal-Semiconductor Contact Reconstruction.
CoRR, March, 2026
2025
Simultaneous recovery of a corroded boundary and admittance using the Kohn-Vogelius method.
CoRR, June, 2025
Numerical solution by shape optimization method to an inverse shape problem in multi-dimensional advection-diffusion problem with space dependent coefficients.
CoRR, April, 2025
A shape-optimization approach for inverse diffusion problems using a single boundary measurement.
CoRR, March, 2025
Localization of tumor through a non-conventional numerical shape optimization technique.
CoRR, February, 2025
Detecting an Immersed Obstacle in Stokes Fluid Flow Using the Coupled Complex Boundary Method.
SIAM J. Control. Optim., 2025
2024
Boundary shape reconstruction with Robin condition: existence result, stability analysis, and inversion via multiple measurements.
Comput. Appl. Math., July, 2024
Comoving mesh method for multi-dimensional moving boundary problems: Mean-curvature flow and Stefan problems.
Math. Comput. Simul., 2024
A robust alternating direction method of multipliers numerical scheme for solving geometric inverse problems in a shape optimization setting.
Comput. Math. Appl., 2024
2023
Numerical solution to the exterior Bernoulli problem using the Dirichlet-Robin energy gap cost functional approach in two and three dimensions.
Numer. Algorithms, September, 2023
2021
2020
A second-order shape optimization algorithm for solving the exterior Bernoulli free boundary problem using a new boundary cost functional.
Comput. Optim. Appl., 2020