In this work we propose a new, general and computationally cheap way to tackle parametrized PDEs defined on domains with variable shape when relying on the reduced basis method. We easily describe a domain by boundary parametrizations, and generate domain (and mesh) deformations by means of a solid extension, obtained by solving a linear elasticity problem. The proposed procedure is built over a two-stages reduction: (1) first, we construct a reduced basis approximation for the mesh motion problem; (2) then, we generate a reduced basis approximation of the state problem, relying on finite element snapshots evaluated over a set of reduced deformed configurations. A Galerkin-POD method is employed to construct both reduced problems, although ...
This thesis details a goal-oriented model reduction framework for parameterized nonlinear partial di...
The objective of this work is to develop a numerical framework to perform rapid and reliable simulat...
In this work, we present an approach for the efficient treatment of parametrized geometries in the c...
In this work we propose a new, general and computationally cheap way to tackle parametrized PDEs def...
In this work we propose a new, general and computationally cheap way to tackle parametrized PDEs def...
The aim of this work is to solve parametrized partial differential equations in computational domain...
The aim of this work is to solve parametrized partial differential equations in computational domain...
In this work, we set up a new, general, and computationally efficient way to tackle parametrized flu...
We propose a model order reduction technique integrating the Shifted Boundary Method (SBM) with a PO...
This work introduces a reduced order modeling (ROM) framework for the solution of parameterized seco...
The reduced basis element method is a new approach for approximating the solution of problems descri...
In this chapter we consider Reduced Basis (RB) approximations of parametrized Partial Differential E...
This thesis details a goal-oriented model reduction framework for parameterized nonlinear partial di...
The objective of this work is to develop a numerical framework to perform rapid and reliable simulat...
In this work, we present an approach for the efficient treatment of parametrized geometries in the c...
In this work we propose a new, general and computationally cheap way to tackle parametrized PDEs def...
In this work we propose a new, general and computationally cheap way to tackle parametrized PDEs def...
The aim of this work is to solve parametrized partial differential equations in computational domain...
The aim of this work is to solve parametrized partial differential equations in computational domain...
In this work, we set up a new, general, and computationally efficient way to tackle parametrized flu...
We propose a model order reduction technique integrating the Shifted Boundary Method (SBM) with a PO...
This work introduces a reduced order modeling (ROM) framework for the solution of parameterized seco...
The reduced basis element method is a new approach for approximating the solution of problems descri...
In this chapter we consider Reduced Basis (RB) approximations of parametrized Partial Differential E...
This thesis details a goal-oriented model reduction framework for parameterized nonlinear partial di...
The objective of this work is to develop a numerical framework to perform rapid and reliable simulat...
In this work, we present an approach for the efficient treatment of parametrized geometries in the c...