Add to ORKGQC 351 A7 no. 26The tensor equations of elasticity in nonorthogonal curvilinear coordinates are presented in a form suitable for the method of dynamic relaxation. This method is described briefly and then is applied to the solution of the problem of elastic deformation of curved mirrors.This title from the Optical Sciences Technical Reports collection is made available by the College of Optical Sciences and the University Libraries, The University of Arizona. If you have questions about titles in this collection, please contact repository@u.library.arizona.edu
The nonlinear theory of Kirchhoff and Clebsch is extended to rods made of nonlocal materials; the mo...
Elasticity is the prototype of constitutive models in Continuum Mechanics. In the nonlinear range, t...
SIGLECNRS T Bordereau / INIST-CNRS - Institut de l'Information Scientifique et TechniqueFRFranc
Based on the adaptive Dynamic Relaxation (aDR) method, a modified adaptive Dynamic Relaxation (maDR)...
Dynamic relaxation is a form-finding and analysis method that has proven its effectiveness in the co...
A common challenge for architects and engineers in the development of structurally efficient systems...
The Geodesic Dynamic Relaxation method1 is an extension of the existing Dynamic Relaxation method th...
Computer Science, Interdisciplinary ApplicationsEngineering, CivilSCI(E)25ARTICLE2609-6143
A new energy relaxation technique for nonconvex inelasticity is applied to an isotropic damage model...
Non-linear waves of deformation in deformed solid bodies are investigated in the paper aiming at the...
The linear and non-linear analysis of curved beams is a very classical but still very discussed topi...
A compliant beam subjected to large deformation is governed by a multifaceted nonlinear differential...
In this study, non-linear vibrations of slightly curved beams are investigated. The curvature is tak...
[EN] This article reviews the different aspects involved in computational form finding of bending-ac...
The centroidal axis of a member that is curved in space is generally a space curve. The curvature of...
The nonlinear theory of Kirchhoff and Clebsch is extended to rods made of nonlocal materials; the mo...
Elasticity is the prototype of constitutive models in Continuum Mechanics. In the nonlinear range, t...
SIGLECNRS T Bordereau / INIST-CNRS - Institut de l'Information Scientifique et TechniqueFRFranc
Based on the adaptive Dynamic Relaxation (aDR) method, a modified adaptive Dynamic Relaxation (maDR)...
Dynamic relaxation is a form-finding and analysis method that has proven its effectiveness in the co...
A common challenge for architects and engineers in the development of structurally efficient systems...
The Geodesic Dynamic Relaxation method1 is an extension of the existing Dynamic Relaxation method th...
Computer Science, Interdisciplinary ApplicationsEngineering, CivilSCI(E)25ARTICLE2609-6143
A new energy relaxation technique for nonconvex inelasticity is applied to an isotropic damage model...
Non-linear waves of deformation in deformed solid bodies are investigated in the paper aiming at the...
The linear and non-linear analysis of curved beams is a very classical but still very discussed topi...
A compliant beam subjected to large deformation is governed by a multifaceted nonlinear differential...
In this study, non-linear vibrations of slightly curved beams are investigated. The curvature is tak...
[EN] This article reviews the different aspects involved in computational form finding of bending-ac...
The centroidal axis of a member that is curved in space is generally a space curve. The curvature of...
The nonlinear theory of Kirchhoff and Clebsch is extended to rods made of nonlocal materials; the mo...
Elasticity is the prototype of constitutive models in Continuum Mechanics. In the nonlinear range, t...
SIGLECNRS T Bordereau / INIST-CNRS - Institut de l'Information Scientifique et TechniqueFRFranc