An assumed hybrid displacement finite element model for elastodynamic cracked problems

This paper deals with a procedure to calculate the elastic stress intensity factors for arbitrary-shaped cracks in plane stress and plane strain problems. An assumed displacement.hybrid finite element model is employed wherein the unknowns in the final algebraic system of equations are the nodal dis

When analyzing axisymmetric solids under torsion the possible reduction of the problem by one dimension, say the independence of the displacement-and rotation-ÿeld of the cylindrical (angle) co-ordinate , should always be exploited. Whereas in the geometrically linear range the purely torsional prob

Analyzing axisymmetric solids under torsional loading the 3d(imensional) problem can always be reduced by one dimension, since the displacement ÿeld and the rotation ÿeld are independent of the cylindrical (angle) co-ordinate , respectively. For this purpose a four-node ring-element for ÿnite deform

An assumed stress hybrid curvilinear triangular finite element is described which is based upon the Kirchhoff theory of plate bending. The derivation extends the assumed stress hybrid technique to curvilinear boundaries where the twelve connectors are related to those of an equilibrium rectilinear e