Haasdonk B, Kleikamp H, Ohlberger M, Schindler F, Wenzel T
Forschungsartikel (Zeitschrift) | Peer reviewedWe present a new surrogate modeling technique for efficient approximation of input-output maps governed by parametrized PDEs. The model is hierarchical as it is built on a full order model (FOM), reduced order model (ROM) and machine-learning (ML) model chain. The model is adaptive in the sense that the ROM and ML model are adapted on-the-fly during a sequence of parametric requests to the model. To allow for a certification of the model hierarchy, as well as to control the adaptation process, we employ rigorous a posteriori error estimates for the ROM and ML models. In particular, we provide an example of an ML-based model that allows for rigorous analytical quality statements. We demonstrate the efficiency of the modeling chain on a Monte Carlo and a parameter-optimization example. Here, the ROM is instantiated by Reduced Basis Methods and the ML model is given by a neural network or a VKOGA kernel model.
Kleikamp, Hendrik | Professur für Angewandte Mathematik, insbesondere Numerik (Prof. Ohlberger) |
Ohlberger, Mario | Professur für Angewandte Mathematik, insbesondere Numerik (Prof. Ohlberger) Center for Nonlinear Science (CeNoS) Center for Multiscale Theory and Computation (CMTC) |
Schindler, Felix Tobias | Professur für Angewandte Mathematik, insbesondere Numerik (Prof. Ohlberger) |