Mixed-enhanced formulation for geometrically linear axisymmetric problems

## Abstract A geometrically nonlinear formulation using total Lagrangian approach is presented for the axisymmetric shell elements. The basic element is formulated using the co‐ordinates of the mid‐surface nodes and the mid‐surface nodal point normals. An important aspect of the formulation present

This contribution is concerned with a new mixed ®nite element formulation for geometrically linear Terzaghi± Biot type ¯uid-saturated porous media. To this end, an extended Hu±Washizu type mixed variational principle is presented for ¯uid-saturated porous continua. Then, a suitable discretization an

This paper presents a new formulation for geometrically non-linear problems and their numerical treatment by the p-version of the ÿnite element method. The formulation is characterized by a weak form based on the spatial representation of the equilibrium equations, a deformed geometry mapped by the