The Koiter-Newton method is a reduced order modeling technique which allows to trace efficiently the entire equilibrium path of a nonlinear structural analysis. In the framework of buckling the method is capable to handle snap-back and snap-through phenomena but may fail to predict reliably bifurcation branches along the equilibrium path. In this contribution we extend the original Koiter-Newton approach with a reliable and accurate bifurcation indicator which is based on an eigenanalysis of the reduced order tangent stiffness matrix. The proposed indicator has a negligible numerical effort since all computations refer to the reduced order model which is typically of very small dimension. The extension allows the identification of bifurcati...
Abstract: Finite element or finite volume discretizations of distributed parameter systems (DPS) typ...
When loading experiments are repeated on different samples, qualitatively different results can occu...
A computational algorithm for predicting the nonlinear dynamic response of a structure is presented....
The Koiter-Newton (K-N) approach is a new reduced basis path-following technique, which combines Koi...
Thin-walled structures, when properly designed, possess a high strength-to-weight and stiffness-to-w...
The Koiter–Newton approach is a reduced-basis method for nonlinear structural analyses. The method c...
The Koiter–Newton approach is a novel reduced order modeling technique for buckling analysis of geom...
This thesis clarifies certain aspects of non-linear eigenanalysis with the help of differential geom...
The harmonic balance (HB) method is widely used in the literature for analyzing the periodic solutio...
rotation Summary. Computation of critical points on an equilibrium path requires solution of a non-l...
Wing structures subjected to large deflections are prone to nonlinear load-deflection behavior. Geom...
The paper deals with geometrically nonlinear finite element analysis of folded-plate and shell struc...
The article proposes a method developed for model order reduction in a Finite Element (FE) framework...
This article discusses the use of generalized eigenanalysis to extract reduced order models from the...
International audienceThe aim of reanalysis methods is to approximate the responses of a structure w...
Abstract: Finite element or finite volume discretizations of distributed parameter systems (DPS) typ...
When loading experiments are repeated on different samples, qualitatively different results can occu...
A computational algorithm for predicting the nonlinear dynamic response of a structure is presented....
The Koiter-Newton (K-N) approach is a new reduced basis path-following technique, which combines Koi...
Thin-walled structures, when properly designed, possess a high strength-to-weight and stiffness-to-w...
The Koiter–Newton approach is a reduced-basis method for nonlinear structural analyses. The method c...
The Koiter–Newton approach is a novel reduced order modeling technique for buckling analysis of geom...
This thesis clarifies certain aspects of non-linear eigenanalysis with the help of differential geom...
The harmonic balance (HB) method is widely used in the literature for analyzing the periodic solutio...
rotation Summary. Computation of critical points on an equilibrium path requires solution of a non-l...
Wing structures subjected to large deflections are prone to nonlinear load-deflection behavior. Geom...
The paper deals with geometrically nonlinear finite element analysis of folded-plate and shell struc...
The article proposes a method developed for model order reduction in a Finite Element (FE) framework...
This article discusses the use of generalized eigenanalysis to extract reduced order models from the...
International audienceThe aim of reanalysis methods is to approximate the responses of a structure w...
Abstract: Finite element or finite volume discretizations of distributed parameter systems (DPS) typ...
When loading experiments are repeated on different samples, qualitatively different results can occu...
A computational algorithm for predicting the nonlinear dynamic response of a structure is presented....