We propose a formulation to derive a reduced order model for geometric nonlinearities which is shown to be valid for a set of parametrized defects. The latter are imposed in terms of the superposition of precomputed perturbations of the nominal structure's 3D-mesh, and parametrized by their amplitudes. A reduced order model is then built once and for all using these defect shapes and the nominal model information only. A suitable reduced order basis is introduced as well in order to effectively represent the influence of the defects on the dynamics of the structure. In contrast to many nonlinear parametric reduced order models, the one we propose does not need any previous training of the model in the parameter space. In this way, prohibiti...
Physics-based numerical simulation remains challenging as the complexity of today’s high-fidelity mo...
Dynamic analysis of large-size finite element models has been commonly applied by mechanical enginee...
Non-intrusive methods have been used since two decades to derive reduced-order models for geometrica...
We propose a formulation to derive a reduced order model for geometric nonlinearities which is shown...
This paper focuses on the reduced order modeling (ROM) of structures with local defects undergoing l...
We present an enhanced version of the parametric nonlinear reduced-order model for shape imperfectio...
The emergence of digital virtualization has brought Reduced Order Models (ROM) into the spotlight. A...
Numerical simulations currently represent one of the most efficient ways of studying complex physica...
We propose a projection-based model order reduction procedure for a general class of parametric quas...
The direct computation of the third-order normal form for a geometrically nonlinear structure discre...
Deriving digital twins of real-life dynamical systems is an intricate modeling task. These represent...
In this paper we describe a simulation methodology based on FEM to automatic generating reduced orde...
The latest advances in the field of design and optimization require new approaches to switch from co...
This thesis proposes the use of Reduced Basis (RB) methods to improve the computational efficiency o...
This paper investigates model-order reduction methods for geometrically nonlinear structures. The pa...
Physics-based numerical simulation remains challenging as the complexity of today’s high-fidelity mo...
Dynamic analysis of large-size finite element models has been commonly applied by mechanical enginee...
Non-intrusive methods have been used since two decades to derive reduced-order models for geometrica...
We propose a formulation to derive a reduced order model for geometric nonlinearities which is shown...
This paper focuses on the reduced order modeling (ROM) of structures with local defects undergoing l...
We present an enhanced version of the parametric nonlinear reduced-order model for shape imperfectio...
The emergence of digital virtualization has brought Reduced Order Models (ROM) into the spotlight. A...
Numerical simulations currently represent one of the most efficient ways of studying complex physica...
We propose a projection-based model order reduction procedure for a general class of parametric quas...
The direct computation of the third-order normal form for a geometrically nonlinear structure discre...
Deriving digital twins of real-life dynamical systems is an intricate modeling task. These represent...
In this paper we describe a simulation methodology based on FEM to automatic generating reduced orde...
The latest advances in the field of design and optimization require new approaches to switch from co...
This thesis proposes the use of Reduced Basis (RB) methods to improve the computational efficiency o...
This paper investigates model-order reduction methods for geometrically nonlinear structures. The pa...
Physics-based numerical simulation remains challenging as the complexity of today’s high-fidelity mo...
Dynamic analysis of large-size finite element models has been commonly applied by mechanical enginee...
Non-intrusive methods have been used since two decades to derive reduced-order models for geometrica...