Add to ORKGThis contribution focuses on the development of Model Order Reduction (MOR) for one-way coupled steady state linear thermomechanical problems in a finite element setting. We apply Proper Orthogonal Decomposition (POD) for the computation of reduced basis space. On the other hand, for the evaluation of the modal coefficients, we use two different methodologies: the one based on the Galerkin projection (G) and the other one based on Artificial Neural Network (ANN). We aim at comparing POD-G and POD-ANN in terms of relevant features including errors and computational efficiency. In this context, both physical and geometrical parametrization are considered. We also carry out a validation of the Full Order Model (FOM) based on customized benchma...
The ongoing advances in numerical mathematics and available computing power combined with the indust...
The latest advances in the field of design and optimization require new approaches to switch from co...
In this work, we present an approach for the efficient treatment of parametrized geometries in the c...
This contribution focuses on the development of Model Order Reduction (MOR) for one-way coupled stea...
Thermo-mechanical finite element (FE) models predict the thermal behavior of machine tools and the a...
Analysing large scale, nonlinear, multiphysical, dynamical structures, by using mathematical modelli...
perform model reduction directly to finite element models developed in ANSYS. The goal of the presen...
In recent years finite element models and multi-body systems in solid mechanics have been becoming m...
The purpose of Reduced‐Order Modelling (ROM) is to substantially lower the computational cost of num...
Software MOR for ANSYS has been developed at IMTEK in 2003. It allows us to perform model reduction ...
Despite the impressive progresses attained by simulation capabilities and techniques, some challengi...
The problem of nonlinear radiative heat transfer is one of great importance to the aerospace industr...
In this paper two different methodologies for model order reduction for thermal problems are analyze...
Physics-based numerical simulation remains challenging as the complexity of today’s high-fidelity mo...
The latest advances in the field of design and optimization require new approaches to switch from co...
The ongoing advances in numerical mathematics and available computing power combined with the indust...
The latest advances in the field of design and optimization require new approaches to switch from co...
In this work, we present an approach for the efficient treatment of parametrized geometries in the c...
This contribution focuses on the development of Model Order Reduction (MOR) for one-way coupled stea...
Thermo-mechanical finite element (FE) models predict the thermal behavior of machine tools and the a...
Analysing large scale, nonlinear, multiphysical, dynamical structures, by using mathematical modelli...
perform model reduction directly to finite element models developed in ANSYS. The goal of the presen...
In recent years finite element models and multi-body systems in solid mechanics have been becoming m...
The purpose of Reduced‐Order Modelling (ROM) is to substantially lower the computational cost of num...
Software MOR for ANSYS has been developed at IMTEK in 2003. It allows us to perform model reduction ...
Despite the impressive progresses attained by simulation capabilities and techniques, some challengi...
The problem of nonlinear radiative heat transfer is one of great importance to the aerospace industr...
In this paper two different methodologies for model order reduction for thermal problems are analyze...
Physics-based numerical simulation remains challenging as the complexity of today’s high-fidelity mo...
The latest advances in the field of design and optimization require new approaches to switch from co...
The ongoing advances in numerical mathematics and available computing power combined with the indust...
The latest advances in the field of design and optimization require new approaches to switch from co...
In this work, we present an approach for the efficient treatment of parametrized geometries in the c...