The goal of most computational simulations is to accurately predict the behavior of a real, physical system. Accurate predictions often require very computationally expensive analyses and so reduced order models (ROMs) are commonly used. ROMs aim to reduce the computational cost of the simulations while still providing accurate results by including all of the salient physics of the real system in the ROM. However, real, physical systems often deviate from the idealized models used in simulations due to variations in manufacturing or other factors. One approach to this issue is to create a parameterized model in order to characterize the effect of perturbations from the nominal model on the behavior of the system. This report presents a meth...
This thesis proposes the use of Reduced Basis (RB) methods to improve the computational efficiency o...
The emergence of digital virtualization has brought Reduced Order Models (ROM) into the spotlight. A...
This monograph addresses the state of the art of reduced order methods for modeling and computationa...
Deriving digital twins of real-life dynamical systems is an intricate modeling task. These represent...
This edited monograph collects research contributions and addresses the advancement of efficient num...
The main goal of the ROMSOC project is to develop new modelling, simulation and optimization (MSO) t...
Injecting parametric dependency and treating nonlinear phenomena pose the main challenges when seeki...
For large computational models, standard deterministic optimization approaches can be prohibitively ...
Computational modeling is a pillar of modern aerospace research and is increasingly becoming more im...
Interpolation of reduced order models (ROM) is an important topic in many areas of model reduction. ...
Reduced order models are computationally inexpensive approximations that capture the important dynam...
This monograph addresses the state of the art of reduced order methods for modeling and computationa...
Abstract. A two-step online method is proposed for interpolating projection-based linear para-metric...
The main goal of the ROMSOC project is to develop new modelling, simulation and optimization (MSO) t...
AbstractThis study focusses on the development of reduced order models, which minimize the computati...
This thesis proposes the use of Reduced Basis (RB) methods to improve the computational efficiency o...
The emergence of digital virtualization has brought Reduced Order Models (ROM) into the spotlight. A...
This monograph addresses the state of the art of reduced order methods for modeling and computationa...
Deriving digital twins of real-life dynamical systems is an intricate modeling task. These represent...
This edited monograph collects research contributions and addresses the advancement of efficient num...
The main goal of the ROMSOC project is to develop new modelling, simulation and optimization (MSO) t...
Injecting parametric dependency and treating nonlinear phenomena pose the main challenges when seeki...
For large computational models, standard deterministic optimization approaches can be prohibitively ...
Computational modeling is a pillar of modern aerospace research and is increasingly becoming more im...
Interpolation of reduced order models (ROM) is an important topic in many areas of model reduction. ...
Reduced order models are computationally inexpensive approximations that capture the important dynam...
This monograph addresses the state of the art of reduced order methods for modeling and computationa...
Abstract. A two-step online method is proposed for interpolating projection-based linear para-metric...
The main goal of the ROMSOC project is to develop new modelling, simulation and optimization (MSO) t...
AbstractThis study focusses on the development of reduced order models, which minimize the computati...
This thesis proposes the use of Reduced Basis (RB) methods to improve the computational efficiency o...
The emergence of digital virtualization has brought Reduced Order Models (ROM) into the spotlight. A...
This monograph addresses the state of the art of reduced order methods for modeling and computationa...