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An explicit time integration technique for dynamic analyses
Author(s) -
Pezeshk S.,
Camp C. V.
Publication year - 1995
Publication title -
international journal for numerical methods in engineering
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.421
H-Index - 168
eISSN - 1097-0207
pISSN - 0029-5981
DOI - 10.1002/nme.1620381308
Subject(s) - simple (philosophy) , displacement (psychology) , explicit and implicit methods , control theory (sociology) , ordinary differential equation , mathematics , structural system , stability (learning theory) , euler's formula , newmark beta method , euler method , mathematical analysis , differential equation , computer science , finite element method , structural engineering , engineering , differential algebraic equation , psychology , philosophy , control (management) , epistemology , artificial intelligence , machine learning , psychotherapist
A simple explicit solution technique for problems in structural dynamics, based on a Modified Trapezoidal rule Method (MTM) approximation of the governing ordinary differential equations, is developed. The resulting conditionally stable explicit method (MTM) can be easily implemented and is extremely simple to use. Particular attention is focused herein on the concept of numerical stability of the proposed method for a free‐vibrational response of a linear undamped Single‐Degree‐Of‐Freedom system (SDOF). To examine the effectiveness, strengths, and limitations of MTM, error analyses for the natural period, the displacement, the velocity and the associated phase angle for a free undamped simple mass–spring system are derived and compared with Modified Euler Method (MEM) and the well‐known Newmark Beta Method (NBM). Numerical examples for a SDOF system and a Multi‐Degree‐Of‐Freedom (MDOF) system are presented to illustrate the strengths and the limitations of the proposed method.