PL
Pablo Lacombe
1 records found
1
Authored
Data Driven Approximations Of PDEs
On Robustness of Reduced Order Mappings between Function Spaces Against Noise
This paper presents a comprehensive exploration of a novel method combining Principal Component Analysis (PCA) and Neural Networks (NN) to efficiently solve Partial Differential Equations (PDEs), a fundamental challenge in modeling a wide range of real-world phenomena. Our resear
...
Contributed
Data Driven Approximations Of PDEs
On Robustness of Reduced Order Mappings between Function Spaces Against Noise
This paper presents a comprehensive exploration of a novel method combining Principal Component Analysis (PCA) and Neural Networks (NN) to efficiently solve Partial Differential Equations (PDEs), a fundamental challenge in modeling a wide range of real-world phenomena. Our resear
...
Data Driven Approximations Of PDEs
On Robustness of Reduced Order Mappings between Function Spaces Against Noise
This paper presents a comprehensive exploration of a novel method combining Principal Component Analysis (PCA) and Neural Networks (NN) to efficiently solve Partial Differential Equations (PDEs), a fundamental challenge in modeling a wide range of real-world phenomena. Our resear
...