In this paper we introduce a procedure for identifying optimal methods in parametric families of numerical schemes for initial value problems in partial differential equations. The procedure maximizes accuracy by adaptively computing optimal parameters that minimize a defect-based estimate of the local error at each time step. Viable refinements are proposed to reduce the computational overheads involved in the solution of the optimization problem, and to maintain conservation properties of the original methods. We apply the new strategy to recently introduced families of conservative schemes for the Korteweg-de Vries equation and for a nonlinear heat equation. Numerical tests demonstrate the improved efficiency of the new technique in comp...
Abstract: The reduced basis (RB) method is an efficient technique to solve parametric partial differ...
This book introduces, in an accessible way, the basic elements of Numerical PDE-Constrained Optimiza...
AbstractWe survey some recent optimality results for the numerical solution of initial value problem...
In this paper we introduce a procedure for identifying optimal methods in parametric families of num...
This thesis deals with the optimal control of PDEs. After a brief introduction in the theory of elli...
Many engineering applications require numerical solution of partial differential equations (PDEs). T...
An optimal finite difference method for the numerical solution of the Cauchy problem for a given par...
We present a certified reduced basis (RB) framework for the efficient solution of PDE-constrained pa...
In the present paper the authors study second-order elliptic parametric partial differential equatio...
In the present paper the authors study second-order elliptic parametric partial differential equatio...
In this thesis we analyze implicit and linearly implicit peer methods in the context of optimization...
Abstract. In this paper, we consider the efficient computation of derivatives of a functional (the q...
We develop a new approach towards error control and adaptivity for finite element discretizations in...
In this paper we present some heuristic strategies to compute rapid and reliable approximations to s...
The governing dynamics of simple and complex processes, whether physical, biological, social, econom...
Abstract: The reduced basis (RB) method is an efficient technique to solve parametric partial differ...
This book introduces, in an accessible way, the basic elements of Numerical PDE-Constrained Optimiza...
AbstractWe survey some recent optimality results for the numerical solution of initial value problem...
In this paper we introduce a procedure for identifying optimal methods in parametric families of num...
This thesis deals with the optimal control of PDEs. After a brief introduction in the theory of elli...
Many engineering applications require numerical solution of partial differential equations (PDEs). T...
An optimal finite difference method for the numerical solution of the Cauchy problem for a given par...
We present a certified reduced basis (RB) framework for the efficient solution of PDE-constrained pa...
In the present paper the authors study second-order elliptic parametric partial differential equatio...
In the present paper the authors study second-order elliptic parametric partial differential equatio...
In this thesis we analyze implicit and linearly implicit peer methods in the context of optimization...
Abstract. In this paper, we consider the efficient computation of derivatives of a functional (the q...
We develop a new approach towards error control and adaptivity for finite element discretizations in...
In this paper we present some heuristic strategies to compute rapid and reliable approximations to s...
The governing dynamics of simple and complex processes, whether physical, biological, social, econom...
Abstract: The reduced basis (RB) method is an efficient technique to solve parametric partial differ...
This book introduces, in an accessible way, the basic elements of Numerical PDE-Constrained Optimiza...
AbstractWe survey some recent optimality results for the numerical solution of initial value problem...