A method of obtaining exact finite element stiffnesses directly from governing differential equations is explained; another method which uses the column analogy is indicated. These can both be modified by matrix manipulation to allow for relaxed restraint conditions. Exact stiffness matrices are given for the straight prismatic beam, the beam-column (or tie), the vibrating beam-column (or tie), the tapered beam and the annular slab. They are compared briefly with matrices obtained from simple polynomial approximations. Further exact finite elements are possible; they minimize convergence problems and their wider usage is advocated.
The stiffness properties of a finite sized square model element of an isotropic plate under plane st...
AbstractThe availability of explicit solutions, i.e. analytical relationships between the structural...
The statical behaviour of a planar bar of an elastic and isotropic material having an arbitrary axis...
Stiffness matrices of beams embedded in an elastic medium and subjected to axial forces are consider...
Transcendental stiffness matrices for vibration (or buckling) have been derived from exact analytica...
In this paper, the derivation of element stiffness matrix of a cracked beam-column element is presen...
An analytical solution for the shape functions of a beam segment supported on a generalized two-para...
The article is dedicated to the discussion on the exact dynamic stiffness matrix method applied to t...
Transcendental stiffness matrices for vibration (or buckling) analysis have long been available for ...
Proceedings - 2001 Annual Technical Session, and Meeting, Structural Stability Research Council, Ft....
Transcendental stiffness matrices are well established in vibration and buckling analysis, having be...
Exact analytical solution and exact secant stiffness matrix with fixed-end forces vector for any non...
Structural analysis of structural parts with stiffness variation can be difficult. The stiffness var...
ABSTRACTVibration analysis of a thin-walled structure can be performed with a consistent mass matrix...
Variable coefficients and complex relations generally characterize the differential equations govern...
The stiffness properties of a finite sized square model element of an isotropic plate under plane st...
AbstractThe availability of explicit solutions, i.e. analytical relationships between the structural...
The statical behaviour of a planar bar of an elastic and isotropic material having an arbitrary axis...
Stiffness matrices of beams embedded in an elastic medium and subjected to axial forces are consider...
Transcendental stiffness matrices for vibration (or buckling) have been derived from exact analytica...
In this paper, the derivation of element stiffness matrix of a cracked beam-column element is presen...
An analytical solution for the shape functions of a beam segment supported on a generalized two-para...
The article is dedicated to the discussion on the exact dynamic stiffness matrix method applied to t...
Transcendental stiffness matrices for vibration (or buckling) analysis have long been available for ...
Proceedings - 2001 Annual Technical Session, and Meeting, Structural Stability Research Council, Ft....
Transcendental stiffness matrices are well established in vibration and buckling analysis, having be...
Exact analytical solution and exact secant stiffness matrix with fixed-end forces vector for any non...
Structural analysis of structural parts with stiffness variation can be difficult. The stiffness var...
ABSTRACTVibration analysis of a thin-walled structure can be performed with a consistent mass matrix...
Variable coefficients and complex relations generally characterize the differential equations govern...
The stiffness properties of a finite sized square model element of an isotropic plate under plane st...
AbstractThe availability of explicit solutions, i.e. analytical relationships between the structural...
The statical behaviour of a planar bar of an elastic and isotropic material having an arbitrary axis...