Reduced Basis Technique for Nonlinear Analysis of Structures

A reduced basis technique and a computational' algorithm are presented for predicting the nonlinear static response of structures. A total Lagrangian formulation is used and the structure is discretized by using displacement finite element models. The nodal displacement vector is expressed as a linear combination of a small number of basis vectors and a Rayleigh-Ritz technique is used to approximate the finite element equations by a reduced system of nonlinear equations. The Rayleigh-Ritz approximation functions (basis vectors) are chosen to be those commonly used in the static perturbation technique namely, a nonlinear solution and a number of its path derivatives. A procedure is outlined for automatically selecting the load (or displacement) step size and monitoring the solution accuracy. The high accuracy and effectiveness of the proposed approach is demonstrated by means of numerical examples.

[1]  Egor P. Popov,et al.  Nonlinear Buckling Analysis of Sandwich Arches , 1971 .

[2]  Ahmed K. Noor,et al.  Approximate techniques of strctural reanalysis , 1974 .

[3]  P. Stern,et al.  Automatic choice of global shape functions in structural analysis , 1978 .

[4]  J. M. T. Thompson,et al.  The non-linear perturbation analysis of discrete structural systems , 1968 .

[5]  K. Bathe,et al.  Formulations and computational algorithms in finite element analysis : U.S.-German symposium , 1977 .

[6]  A. C. Walker,et al.  A non-linear finite element analysis of shallow circular arches , 1969 .

[7]  Giles W Hunt,et al.  A general theory of elastic stability , 1973 .

[8]  Graham H. Powell,et al.  Finite element analysis of non-linear static and dynamic response , 1977 .

[9]  A. Noor,et al.  Computerized symbolic manipulation in structural mechanics—Progress and potential , 1979 .

[10]  Ernest F. Masur,et al.  Buckling of Shallow Arches , 1966 .

[11]  J. F. Besseling Non-linear analysis of structures by the finite element method as a supplement to a linear analysis , 1974 .

[12]  Ahmed K. Noor,et al.  Nonlinear finite element analysis of curved beams , 1977 .

[13]  H. Miura,et al.  An approximate analysis technique for design calculations , 1971 .

[14]  G. Dhatt,et al.  Finite element large deflection analysis of shallow shells , 1976 .

[15]  P. Bergan,et al.  Solution techniques for non−linear finite element problems , 1978 .

[16]  Dennis A. Nagy,et al.  Modal representation of geometrically nonlinear behavior by the finite element method , 1979 .