We study discretization in classes of integro-differential equationswhere the functions aj(t), 1 ≤ j ≤n, are completely monotonic on (0, ∞) and locally integrable, but not constant. The equations are discretize...We study discretization in classes of integro-differential equationswhere the functions aj(t), 1 ≤ j ≤n, are completely monotonic on (0, ∞) and locally integrable, but not constant. The equations are discretized using the backward Euler method in combination with order one convolution quadrature for the memory term. The stability properties of the discretization are derived in the weighted 11 (p; 0, ∞) norm, where p is a given weight function. Applications to the weighted l^1 stability of the numerical solutions of a related equation in Hilbert space are given.展开更多
基金supported by National Natural Science Foundation of China(Grant No.10971062)
文摘We study discretization in classes of integro-differential equationswhere the functions aj(t), 1 ≤ j ≤n, are completely monotonic on (0, ∞) and locally integrable, but not constant. The equations are discretized using the backward Euler method in combination with order one convolution quadrature for the memory term. The stability properties of the discretization are derived in the weighted 11 (p; 0, ∞) norm, where p is a given weight function. Applications to the weighted l^1 stability of the numerical solutions of a related equation in Hilbert space are given.
