A new numerical technique for post-buckling analysis is presented by combining the Asymptotic Numerical Method (ANM) and the Taylor Meshless Method (TMM). These two methods are based on Taylor series, with respect to a scalar load parameter for ANM and with respect to the space variables for TMM. The advantage of ANM is an adaptive step length and this is very efficient near bifurcation points. The specificity of TMM is a quasi-exact solution of the PDEs inside the domain, which leads to a strong reduction of the number of degrees of freedom (DOFs)
AbstractVarious static and dynamic aspects of post-buckled thin plates, including the transition of ...
Consider algorithms to solve eigenvalue problems for partial differential equations describing the b...
Summarization: The paper deals with a nonlinear buckling problem for von Karman elastic plates in be...
International audienceA new numerical technique for post-buckling analysis is presented by combining...
This paper introduces a new meshless method named Taylor Meshless Method (TMM) using Taylor series t...
AbstractIt has been indicated by Bauer et al. and Golubitsky et al. that modejumping ...
We study numerical approximations of bifurcating solution curves of the von Karman equations with si...
This thesis was submitted for the degree of Doctor of Philosophy and awarded by Brunel University.Th...
International audienceThis paper is concerned with a Taylor series based continuation algorithm, ie,...
International audienceThis paper describes a generic Taylor series based continuation method, the so...
An asymptotic numerical method is presented for computing the post-buckling behaviour of perfect and...
AbstractWe examine the possible types of generic bifurcation than can occur for a three-parameter fa...
AbstractWith the secondary bifurcation and the local post-secondary buckling behavior being analyzed...
A new class of meshless method – Taylor Meshless Method (TMM) - has been introduced that relies on a...
The objective of this thesis is to present numerical algorithms for the detection of bifurcation poi...
AbstractVarious static and dynamic aspects of post-buckled thin plates, including the transition of ...
Consider algorithms to solve eigenvalue problems for partial differential equations describing the b...
Summarization: The paper deals with a nonlinear buckling problem for von Karman elastic plates in be...
International audienceA new numerical technique for post-buckling analysis is presented by combining...
This paper introduces a new meshless method named Taylor Meshless Method (TMM) using Taylor series t...
AbstractIt has been indicated by Bauer et al. and Golubitsky et al. that modejumping ...
We study numerical approximations of bifurcating solution curves of the von Karman equations with si...
This thesis was submitted for the degree of Doctor of Philosophy and awarded by Brunel University.Th...
International audienceThis paper is concerned with a Taylor series based continuation algorithm, ie,...
International audienceThis paper describes a generic Taylor series based continuation method, the so...
An asymptotic numerical method is presented for computing the post-buckling behaviour of perfect and...
AbstractWe examine the possible types of generic bifurcation than can occur for a three-parameter fa...
AbstractWith the secondary bifurcation and the local post-secondary buckling behavior being analyzed...
A new class of meshless method – Taylor Meshless Method (TMM) - has been introduced that relies on a...
The objective of this thesis is to present numerical algorithms for the detection of bifurcation poi...
AbstractVarious static and dynamic aspects of post-buckled thin plates, including the transition of ...
Consider algorithms to solve eigenvalue problems for partial differential equations describing the b...
Summarization: The paper deals with a nonlinear buckling problem for von Karman elastic plates in be...