Hierarchical model reduction driven by machine learning for parametric advection-diffusion-reaction problems in the presence of noisy data

Keywords

Advanced Numerical Methods for Scientific Computing
Code:
19/2022
Title:
Hierarchical model reduction driven by machine learning for parametric advection-diffusion-reaction problems in the presence of noisy data
Date:
Monday 11th April 2022
Author(s):
Lupo Pasini, M.; Perotto, S.
Download link:
Abstract:
We propose a new approach to generate a reliable reduced model for a parametric elliptic problem, in the presence of noisy data. The reference model reduction procedure is the directional HiPOD method, which combines Hierarchical Model reduction with a standard Proper Orthogonal Decomposition, according to an offline/online paradigm. In this paper we show that directional HiPOD looses in terms of accuracy when problem data are affected by noise. This is due to the interpolation driving the online phase, since it replicates, by definition, the noise trend. To overcome this limit, we replace interpolation with Machine Learning fitting models which better discriminate relevant physical features in the data from irrelevant unstructured noise. The numerical assessment, although preliminary, confirms the potentialities of the new approach.