Add to ORKGThe cubic "convolution spline'" method for first kind Volterra convolution integral equations was introduced in [Convolution spline approximations of Volterra integral equations, J. Integral Equations Appl., 26:369--410, 2014]. Here we analyse its stability and convergence for a broad class of piecewise smooth kernel functions and show it is stable and fourth order accurate even when the kernel function is discontinuous. Key tools include a new discrete Gronwall inequality which provides a stability bound when there are jumps in the kernel function, and a new error bound obtained from a particular B-spline quasi-interpolant
We analyze the stability of convolution quadrature methods for weakly singular Volterra integral equ...
An arbitrarily high-order method for the approximate solution of singular Volterra integral equation...
While the numerical solution of one-dimensional Volterra integral equations of the second kind with ...
The cubic "convolution spline'" method for first kind Volterra convolution integral equations was in...
We present a comprehensive convergence analysis for discontinuous piecewise polynomial approximation...
Linear multistep methods for ordinary differential equations generate convolution quadrature rules. ...
AbstractA family of test equations is suggested for first and second kind nonsingular Volterra integ...
Asymptotically convolution Volterra equations are characterized by kernel functions which exponentia...
A procedure, using spline functions of degree m, for the solution of linear Volterra integral equati...
We introduce a new "convolution spline'' temporal approximation of time domain boundary integral equ...
We propose a piecewise polynomial collocation method for solving linear Volterra integral equations ...
Numerical stability of the spline collocation method by piecewise polynomials for Volterra integro‐d...
Neste trabalho pesquisamos a ordem de convergência atingível da aproximação num certo espaço polinom...
In this paper we investigate the attainable order of (global) convergence of collocation approximati...
The objective of this paper was to present a new inverse problem statement and numerical method for ...
We analyze the stability of convolution quadrature methods for weakly singular Volterra integral equ...
An arbitrarily high-order method for the approximate solution of singular Volterra integral equation...
While the numerical solution of one-dimensional Volterra integral equations of the second kind with ...
The cubic "convolution spline'" method for first kind Volterra convolution integral equations was in...
We present a comprehensive convergence analysis for discontinuous piecewise polynomial approximation...
Linear multistep methods for ordinary differential equations generate convolution quadrature rules. ...
AbstractA family of test equations is suggested for first and second kind nonsingular Volterra integ...
Asymptotically convolution Volterra equations are characterized by kernel functions which exponentia...
A procedure, using spline functions of degree m, for the solution of linear Volterra integral equati...
We introduce a new "convolution spline'' temporal approximation of time domain boundary integral equ...
We propose a piecewise polynomial collocation method for solving linear Volterra integral equations ...
Numerical stability of the spline collocation method by piecewise polynomials for Volterra integro‐d...
Neste trabalho pesquisamos a ordem de convergência atingível da aproximação num certo espaço polinom...
In this paper we investigate the attainable order of (global) convergence of collocation approximati...
The objective of this paper was to present a new inverse problem statement and numerical method for ...
We analyze the stability of convolution quadrature methods for weakly singular Volterra integral equ...
An arbitrarily high-order method for the approximate solution of singular Volterra integral equation...
While the numerical solution of one-dimensional Volterra integral equations of the second kind with ...