It has recently been observed that Least-Squares Finite Element methods (LS-FEMs) can be used to assimilate experimental data into approximations of PDEs in a natural way, as shown by Heyes et al. in the case of incompressible Navier Stokes ow [1]. The approach was shown to be effective without regularization terms, and can handle substantial noise in the experimental data without filtering. Of great practical importance is that { unlike other data assimilation techniques { it is not signifcantly more expensive than a single physical simulation. However the method as presented so far in the literature is not set in the context of an inverse problem framework, so that for example the meaning of the final result is unclear. In this paper it i...
The weak-constraint inverse for nonlinear dynamical models is discussed and derived in terms of a pr...
With very few exceptions, data assimilation methods which have been used or proposed for use with oc...
The development of numerical methods in incompressible fluid dynamics has recently received a strong...
It has recently been observed that Least-Squares Finite Element methods (LS-FEMs) can be used to ass...
Abstract. It has recently been observed that Least-Squares Finite Element methods (LS-FEMs) can be u...
We investigate theoretically and numerically the use of the least-squares finite-element method (LSF...
The reliable and effective assimilation of measurements and numerical simulations in engin...
Lagrangian data arise from instruments that are carried by the flow in a fluid field. Assimilation o...
International audienceIn this paper, we shall investigate sequential data assimilation techniques to...
The variational approach to data assimilation is a widely used methodology for both online predictio...
The local size of computational grids used in partial differential equation (PDE)-based probabilisti...
During the last decade, the numerical modeling of three-dimensional blood flow in compliant arteries...
We study Bayesian data assimilation (filtering) for time-evolution Partial differential equations (P...
The local size of computational grids used in partial differential equation (PDE)-based probabilisti...
The viewpoint taken in this paper is that data assimilation is fundamentally a statistical problem a...
The weak-constraint inverse for nonlinear dynamical models is discussed and derived in terms of a pr...
With very few exceptions, data assimilation methods which have been used or proposed for use with oc...
The development of numerical methods in incompressible fluid dynamics has recently received a strong...
It has recently been observed that Least-Squares Finite Element methods (LS-FEMs) can be used to ass...
Abstract. It has recently been observed that Least-Squares Finite Element methods (LS-FEMs) can be u...
We investigate theoretically and numerically the use of the least-squares finite-element method (LSF...
The reliable and effective assimilation of measurements and numerical simulations in engin...
Lagrangian data arise from instruments that are carried by the flow in a fluid field. Assimilation o...
International audienceIn this paper, we shall investigate sequential data assimilation techniques to...
The variational approach to data assimilation is a widely used methodology for both online predictio...
The local size of computational grids used in partial differential equation (PDE)-based probabilisti...
During the last decade, the numerical modeling of three-dimensional blood flow in compliant arteries...
We study Bayesian data assimilation (filtering) for time-evolution Partial differential equations (P...
The local size of computational grids used in partial differential equation (PDE)-based probabilisti...
The viewpoint taken in this paper is that data assimilation is fundamentally a statistical problem a...
The weak-constraint inverse for nonlinear dynamical models is discussed and derived in terms of a pr...
With very few exceptions, data assimilation methods which have been used or proposed for use with oc...
The development of numerical methods in incompressible fluid dynamics has recently received a strong...