Sparsity regularization method plays an important role in reconstructing parameters. Compared with traditional regularization methods, sparsity regularization method has the ability to obtain better performance for reconstructing sparse parameters. However, sparsity regularization method does not have the ability to reconstruct smooth parameters. For overcoming this difficulty, we combine a sparsity regularization method with a wavelet method in order to transform smooth parameters into sparse parameters. We use a sparsity-homotopy perturbation inversion method to improve the accuracy and stability and apply the proposed method to reconstruct parameters for a Black-Scholes option pricing model and a Todaro model. Numerical experiments show ...
This thesis is a contribution to the field of ill-posed inverse problems . During the last ten year...
Partially linear models have a linear part as in the linear regression and a non-linear part similar...
In this paper wavelet-based fast algorithms for Black-Scholes option pricing model, generalized Blac...
The inversion of electromagnetic induction data to a conductivity profile is an ill-posed problem. R...
We present a realistic application of an inversion scheme for global seismic tomography that uses as...
This contribution deals with the numerical solution of the Black-Scholes equation. The Crank-Nicolso...
International audienceWe present a realistic application of an inversion scheme for global seismic t...
Sparse regularization of operator equations has already shown its effectiveness both theoretically a...
Statistical dependencies among wavelet coefficients are commonly represented by graphical models suc...
In many scientific and industrial applications, the quantity of interest is not what is directly obs...
Sparsity-based estimation techniques deal with the problem of retrieving a data vector from an under...
n this paper, we consider the sparse regularization of manifold-valued data with respect to an inter...
This thesis deals with regularization parameter selection methods in the context of Tikhonov-type re...
Sparsity regularization method has been analyzed for linear and nonlinear inverse problems over the ...
abstract: Imaging technologies such as Magnetic Resonance Imaging (MRI) and Synthetic Aperture Radar...
This thesis is a contribution to the field of ill-posed inverse problems . During the last ten year...
Partially linear models have a linear part as in the linear regression and a non-linear part similar...
In this paper wavelet-based fast algorithms for Black-Scholes option pricing model, generalized Blac...
The inversion of electromagnetic induction data to a conductivity profile is an ill-posed problem. R...
We present a realistic application of an inversion scheme for global seismic tomography that uses as...
This contribution deals with the numerical solution of the Black-Scholes equation. The Crank-Nicolso...
International audienceWe present a realistic application of an inversion scheme for global seismic t...
Sparse regularization of operator equations has already shown its effectiveness both theoretically a...
Statistical dependencies among wavelet coefficients are commonly represented by graphical models suc...
In many scientific and industrial applications, the quantity of interest is not what is directly obs...
Sparsity-based estimation techniques deal with the problem of retrieving a data vector from an under...
n this paper, we consider the sparse regularization of manifold-valued data with respect to an inter...
This thesis deals with regularization parameter selection methods in the context of Tikhonov-type re...
Sparsity regularization method has been analyzed for linear and nonlinear inverse problems over the ...
abstract: Imaging technologies such as Magnetic Resonance Imaging (MRI) and Synthetic Aperture Radar...
This thesis is a contribution to the field of ill-posed inverse problems . During the last ten year...
Partially linear models have a linear part as in the linear regression and a non-linear part similar...
In this paper wavelet-based fast algorithms for Black-Scholes option pricing model, generalized Blac...