[1] In this paper we present a method of incorporating semivariogram constraints into nonlinear inversion problems. That is, we describe a method of sampling the space of inverse solutions that honor a specified semivariogram or set of semivariograms and also explain a set of state data. The approach can be considered a method of conditional simulation where model conditioning is based upon state data (as opposed to parameter data). The difference between this approach and other simulation approaches is that the simulation is posed as an optimization problem with the joint objective of matching the semivariograms and honoring the state data. This approach requires computing the sensitivities of the semivariograms with respect to the distrib...
International audienceInverse modeling of geophysical data involves the recovery of a subsurface str...
Solving spatial inverse problems in Earth Sciences remains a big challenge given the high number of ...
Nonlocal moment equations allow one to render deterministically optimum predictions of flow in rando...
In this paper we present a method of incorporating semivariogram constraints into nonlinear inversio...
We consider the computational challenges associated with uncertainty quantification in high-dimensio...
In contrast to deterministic inversion, probabilistic Bayesian inversion provides an ensemble of sol...
In geophysical inversion the model parameterisation, the number of unknown the level of smoothing a...
[1] Interpolation and inverse modeling problems are ubiquitous in environmental sciences. In many ap...
22 p.International audiencePartition modelling is a statistical method for nonlinear regression and ...
International audienceIn the uncertainty treatment framework considered, the intrinsic variability o...
Many geophysical inverse problems are ill-posed leading to non-uniqueness of the solution. It is thu...
Geophysical inverse problems can be posed as the minimization of an objective function where one ter...
This thesis introduce a new parameterization of the model space in global inversion problems. The pa...
A greedy algorithm for the construction of a reduced model with reduction in both parameter and stat...
The weak-constraint inverse for nonlinear dynamical models is discussed and derived in terms of a pr...
International audienceInverse modeling of geophysical data involves the recovery of a subsurface str...
Solving spatial inverse problems in Earth Sciences remains a big challenge given the high number of ...
Nonlocal moment equations allow one to render deterministically optimum predictions of flow in rando...
In this paper we present a method of incorporating semivariogram constraints into nonlinear inversio...
We consider the computational challenges associated with uncertainty quantification in high-dimensio...
In contrast to deterministic inversion, probabilistic Bayesian inversion provides an ensemble of sol...
In geophysical inversion the model parameterisation, the number of unknown the level of smoothing a...
[1] Interpolation and inverse modeling problems are ubiquitous in environmental sciences. In many ap...
22 p.International audiencePartition modelling is a statistical method for nonlinear regression and ...
International audienceIn the uncertainty treatment framework considered, the intrinsic variability o...
Many geophysical inverse problems are ill-posed leading to non-uniqueness of the solution. It is thu...
Geophysical inverse problems can be posed as the minimization of an objective function where one ter...
This thesis introduce a new parameterization of the model space in global inversion problems. The pa...
A greedy algorithm for the construction of a reduced model with reduction in both parameter and stat...
The weak-constraint inverse for nonlinear dynamical models is discussed and derived in terms of a pr...
International audienceInverse modeling of geophysical data involves the recovery of a subsurface str...
Solving spatial inverse problems in Earth Sciences remains a big challenge given the high number of ...
Nonlocal moment equations allow one to render deterministically optimum predictions of flow in rando...