Unconditionally Stable Time-Step-Integration Algorithms Based on Hamilton's Principle

In this paper, unconditionally stable higher-order accurate time-step integration algorithms for linear ®rst-order dierential equations based on the collocation method are presented. The ampli®cation factor at the end of the spectrum is a controllable algorithmic parameter. The collocation parameter

In this paper, unconditionally stable higher-order accurate time step integration algorithms suitable for linear "rst-order di!erential equations based on the weighted residual method are presented. Instead of specifying the weighting functions, the weighting parameters are used to control the algor

In this paper, unconditionally stable higher-order accurate time step integration algorithms suitable for linear second-order di!erential equations based on the weighted residual method are presented. The second-order equations are manipulated directly. As in Part 1 of this paper, instead of specify

An accurate algorithm for the integration of the equations of motion arising in structural dynamics is presented. The algorithm is an unconditionally stable single-step implicit algorithm incorporating algorithmic damping. The displacement for a Single-Degree-of-Freedom system is approximated within