Elliptic Partial Differential Equation
Elliptic partial differential equations (PDEs) describe a wide range of steady-state physical phenomena, and solving them efficiently is crucial across many scientific and engineering disciplines. Current research focuses on developing and analyzing novel numerical methods, particularly those leveraging neural networks, including architectures like operator networks and physics-informed neural networks, to overcome computational challenges associated with high dimensionality and complex geometries. These advanced techniques aim to improve accuracy, speed, and scalability compared to traditional methods, ultimately impacting fields like fluid dynamics, materials science, and optimal control.
Papers
October 18, 2024
September 18, 2024
June 22, 2024
May 31, 2024
April 27, 2024
March 18, 2024
January 30, 2024
January 17, 2024
November 7, 2023
September 28, 2023
August 23, 2023
August 15, 2023
June 21, 2023
April 21, 2023
April 7, 2023
February 24, 2023
February 5, 2023
November 16, 2022
October 28, 2022
October 25, 2022