Since the epoch-making "memoir" of Saint-Venant in 1855 the torsion of prismatic and cilindrical bars has reduced to a mathematical problem: the calculation of an analytical function satisfying prescribed boundary values. For over one century, till the first applications of the F.E.M. to the problem, the only possibility of study in irregularly shaped domains was the beatiful, but limitated, theory of complex function analysis, several functional approaches and the finite difference method. Nevertheless in 1963 Jaswon published an interestingpaper which was nearly lost between the splendid F. E.M. boom. The method was extended by Rizzo to more complicated problems and definitively incorporated to the scientific community background through...
The Dirichlet's problem for equations of Laplace and Poisson in complex regions with a non-smooth bo...
In this paper, a novel complex potential function for the solution of the flexure–torsion problem in...
The accuracy and the merit of the Overhauser cubic spline as an isoparametric representation in solv...
Since the epoch-making "memoir" of Saint-Venant in 1855 the torsion of prismatic and cilindrical bar...
This paper provides solutions for De Saint-Venant torsion problem on a beam with arbitrary and unif...
The Complex Variable Boundary Element Method (CVBEM) has been shown to be an effective numerical tec...
In this paper an innovative numerical method named as line element-less method, LEM, for finding sol...
The BEM is applied to the solution of the torsion problem of non-homogeneous anisotropic non-circula...
The construction of truly competitive boundary-element (BE) codes, capable of analyzing real-life en...
Summary--This paper deals with a finite-difference solution of the torsion problem of nonhomogeneous...
AbstractA new technique for treating surface discontinuities within boundary element calculations is...
Abstract The scaled boundary finite-element method is a new semi-analytical approach to computationa...
The boundary integral method was applied to the elastoplastic analysis of the torsion of prismatic b...
In this paper a boundary element method is developed for calculating torsional rigidity of inhomogen...
In this paper it has been shown that the boundary collocation method can be used to evaluate the tor...
The Dirichlet's problem for equations of Laplace and Poisson in complex regions with a non-smooth bo...
In this paper, a novel complex potential function for the solution of the flexure–torsion problem in...
The accuracy and the merit of the Overhauser cubic spline as an isoparametric representation in solv...
Since the epoch-making "memoir" of Saint-Venant in 1855 the torsion of prismatic and cilindrical bar...
This paper provides solutions for De Saint-Venant torsion problem on a beam with arbitrary and unif...
The Complex Variable Boundary Element Method (CVBEM) has been shown to be an effective numerical tec...
In this paper an innovative numerical method named as line element-less method, LEM, for finding sol...
The BEM is applied to the solution of the torsion problem of non-homogeneous anisotropic non-circula...
The construction of truly competitive boundary-element (BE) codes, capable of analyzing real-life en...
Summary--This paper deals with a finite-difference solution of the torsion problem of nonhomogeneous...
AbstractA new technique for treating surface discontinuities within boundary element calculations is...
Abstract The scaled boundary finite-element method is a new semi-analytical approach to computationa...
The boundary integral method was applied to the elastoplastic analysis of the torsion of prismatic b...
In this paper a boundary element method is developed for calculating torsional rigidity of inhomogen...
In this paper it has been shown that the boundary collocation method can be used to evaluate the tor...
The Dirichlet's problem for equations of Laplace and Poisson in complex regions with a non-smooth bo...
In this paper, a novel complex potential function for the solution of the flexure–torsion problem in...
The accuracy and the merit of the Overhauser cubic spline as an isoparametric representation in solv...