Recently, there has been a great interest in analysing dynamical flows, where the stationary limit is the minimiser of a convex energy. Particular flows of great interest have been continuous limits of Nesterov’s algorithm and the fast iterative shrinkage-thresholding algorithm, respectively. In this paper, we approach the solutions of linear ill-posed problems by dynamical flows. Because the squared norm of the residual of a linear operator equation is a convex functional, the theoretical results from convex analysis for energy minimising flows are applicable. However, in the restricted situation of this paper they can often be significantly improved. Moreover, since we show that the proposed flows for minimising the norm of the residual o...
AbstractWe study the asymptotic behavior of the solutions to evolution equations of the form 0∈u(t)+...
AbstractA new regularized projection method was developed for numerically solving ill-posed equation...
We study \textit{rescaled gradient dynamical systems} in a Hilbert space $\mathcal{H}$, where implic...
AbstractIn this paper we derive conditions under which the constrained Tikhonov-regularized solution...
In a Hilbert space, we provide a fast dynamic approach to the hierarchical minimization problem whic...
We revisit in L2-spaces the autoconvolution equation x ∗ x = y with solutions which are real-valued ...
In this article, we prove optimal convergence rates results for regularization methods for solving l...
The stable approximate solution of ill-posed linear operator equations in Hilbert spaces requires re...
Tikhonov-type regularization of linear and nonlinear ill-posed problems in abstract spaces under spa...
International audienceIn a Hilbert space, we provide a fast dynamic approach to the hierarchical min...
AbstractAfter a general discussion about convergence and convergence rates for regularization method...
International audienceIn this paper, we study the behavior of solutions of the ODE associated to Nes...
In this paper, we propose an interior-point method for linearly constrained optimization problems (p...
In a Hilbertian framework, for the minimization of a general convex differentiable function f , we i...
There are various ways to regularize ill-posed operator equations in Hilbert space. If the underlyin...
AbstractWe study the asymptotic behavior of the solutions to evolution equations of the form 0∈u(t)+...
AbstractA new regularized projection method was developed for numerically solving ill-posed equation...
We study \textit{rescaled gradient dynamical systems} in a Hilbert space $\mathcal{H}$, where implic...
AbstractIn this paper we derive conditions under which the constrained Tikhonov-regularized solution...
In a Hilbert space, we provide a fast dynamic approach to the hierarchical minimization problem whic...
We revisit in L2-spaces the autoconvolution equation x ∗ x = y with solutions which are real-valued ...
In this article, we prove optimal convergence rates results for regularization methods for solving l...
The stable approximate solution of ill-posed linear operator equations in Hilbert spaces requires re...
Tikhonov-type regularization of linear and nonlinear ill-posed problems in abstract spaces under spa...
International audienceIn a Hilbert space, we provide a fast dynamic approach to the hierarchical min...
AbstractAfter a general discussion about convergence and convergence rates for regularization method...
International audienceIn this paper, we study the behavior of solutions of the ODE associated to Nes...
In this paper, we propose an interior-point method for linearly constrained optimization problems (p...
In a Hilbertian framework, for the minimization of a general convex differentiable function f , we i...
There are various ways to regularize ill-posed operator equations in Hilbert space. If the underlyin...
AbstractWe study the asymptotic behavior of the solutions to evolution equations of the form 0∈u(t)+...
AbstractA new regularized projection method was developed for numerically solving ill-posed equation...
We study \textit{rescaled gradient dynamical systems} in a Hilbert space $\mathcal{H}$, where implic...