Reduced minimization of Mindlin plate

This paper presents concepts of two-dimensional reduced minimization of product type and non-product type: the analytical reduced minimization theory in one dimension when extended to that of Mindlin plate elements reveals that the two-dimensional reduced minimization for Lagrangian plate elements c

## Abstract For the displacement‐based Lagrangian Mindlin plate elements oriented arbitrarily under uniform isoparametric mapping without internal distortion, a theoretical interpretation on the conventional shear‐reduced integration is presented by introducing the concept of reduced minimization.

The problem of damping out the vibrations of a thick plate is solved using the optimal control theory of distributed parameter systems. The plate is modelled as a Mindlin Timoshenko plate to include shear efSects and may exhibit viscous damping. The dynamic response of the structure comprises the di

We deal with the approximation of the Reissner±Mindlin plate problem by means of ®nite element techniques. We consider a non-standard mixed formulation recently proposed by Arnold and Brezzi. These methods are based on a suitable splitting, depending on a parameter, of the shear energy term into two