Geometric numerical integrators based on the Magnus expansion in bifurcation problems for non-linear elastic solids

A. Castellano; P. Foti; A. Fraddosio; S. Marzano; M. D. Piccioni

doi:10.3221/IGF-ESIS.29.12

Frattura ed Integrità Strutturale (Jul 2014)

Geometric numerical integrators based on the Magnus expansion in bifurcation problems for non-linear elastic solids

A. Castellano,
P. Foti,
A. Fraddosio,
S. Marzano,
M. D. Piccioni

Affiliations

A. Castellano: Politecnico di Bari
P. Foti: Politecnico di Bari
A. Fraddosio: Politecnico di Bari
S. Marzano: Politecnico di Bari
M. D. Piccioni: Politecnico di Bari

DOI: https://doi.org/10.3221/IGF-ESIS.29.12
Journal volume & issue: Vol. 8, no. 29
pp. 128 – 138

Abstract

Read online

We illustrate a procedure based on the Magnus expansion for studying mechanical problems which lead to non-autonomous systems of linear ODE’s. The effectiveness of the Magnus method is enlighten by the analysis of a bifurcation problem in the framework of three-dimensional non-linear elasticity. In particular, for an isotropic compressible elastic tube subject to an azimuthal shear primary deformation we study the possibility of axially periodic twist-like bifurcations. The approximate matricant of the resulting differential problem and the first singular value of the bifurcating load corresponding to a non-trivial bifurcation are determined by employing a simplified version of the Magnus method, characterized by a truncation of the Magnus series after the second term.

Nonlinear elasticity; Bifurcation; Geometric numerical integrators; Magnus expansion.

Published in Frattura ed Integrità Strutturale

ISSN: 1971-8993 (Online)
Publisher: Gruppo Italiano Frattura
Country of publisher: Italy
LCC subjects: Technology: Mechanical engineering and machinery; Technology: Engineering (General). Civil engineering (General): Structural engineering (General)
Website: http://www.fracturae.com/index.php/fis/index

About the journal

Abstract

Keywords