This article describes a bridge between POD-based model order reduction techniques and the classical Newton/Krylov solvers. This bridge is used to derive an efficient algorithm to correct, “on-the-fly”, the reduced order modelling of highly nonlinear problems undergoing strong topological changes. Damage initiation problems tackled via a corrected hyperreduction method are used as an example. It is shown that the relevancy of reduced order model can be significantly improved with reasonable additional costs when using this algorithm, even when strong topological changes are involved
A new strategy for the ecient solution of highly nonlinear structural problems is proposed in this p...
Nowadays, the use of Hyper Reduced Order Models (HROMs) to tackle the high computational complexity ...
Many natural phenomena can be modeled as ordinary or partial differential equations. A way to find s...
This article describes a bridge between POD-based model order reduction techniques and the classical...
peer reviewedIn this paper, we develop a bridge between POD-based model order reduction techniques a...
We propose a reduced order modelling technique based on a partitioning of the domain of study in the...
International audienceThis paper deals with the extension of proper generalized decomposition method...
In this document we review the status of existing techniques for nonlinear model order reduction by ...
Model order reduction appears to be beneficial for the synthesis and simulation of compliant mechani...
International audienceIn this paper, we develop a novel algorithm for the dimensional reduction of t...
Solutions of (nonlinear) complex systems are expensive with respect to both storage and CPU costs. A...
This paper deals with the extension of Proper Generalized Decomposition (PGD) methods to non-linear ...
Thesis (S.M.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1999.Includes bibliograp...
The large-scale structure systems in engineering are complex, high dimensional, and variety of physi...
Numerical simulations currently represent one of the most efficient ways of studying complex physica...
A new strategy for the ecient solution of highly nonlinear structural problems is proposed in this p...
Nowadays, the use of Hyper Reduced Order Models (HROMs) to tackle the high computational complexity ...
Many natural phenomena can be modeled as ordinary or partial differential equations. A way to find s...
This article describes a bridge between POD-based model order reduction techniques and the classical...
peer reviewedIn this paper, we develop a bridge between POD-based model order reduction techniques a...
We propose a reduced order modelling technique based on a partitioning of the domain of study in the...
International audienceThis paper deals with the extension of proper generalized decomposition method...
In this document we review the status of existing techniques for nonlinear model order reduction by ...
Model order reduction appears to be beneficial for the synthesis and simulation of compliant mechani...
International audienceIn this paper, we develop a novel algorithm for the dimensional reduction of t...
Solutions of (nonlinear) complex systems are expensive with respect to both storage and CPU costs. A...
This paper deals with the extension of Proper Generalized Decomposition (PGD) methods to non-linear ...
Thesis (S.M.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1999.Includes bibliograp...
The large-scale structure systems in engineering are complex, high dimensional, and variety of physi...
Numerical simulations currently represent one of the most efficient ways of studying complex physica...
A new strategy for the ecient solution of highly nonlinear structural problems is proposed in this p...
Nowadays, the use of Hyper Reduced Order Models (HROMs) to tackle the high computational complexity ...
Many natural phenomena can be modeled as ordinary or partial differential equations. A way to find s...