Minimizing Nonconvex, Simple Integrals of Product Type

## Existence of AC minimizers under the general hypotheses of lower semicontinuity, boundedness below, and superlinear growth at inÿnity in x (•). Any nonconvex function h : R → [0; + ∞] will do, provided it is convex at = 0. Moreover, minimizers are shown to satisfy several regularity properties

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

In the present paper, we use a generalization of the Euler-Maclaurin summation formula for integrals of the form b a F 0 (x)g(x)dx where F 0 (x) (the weight) is a continuous and positive function and g(x) is twice continuously differentiable function in the interval [a, b]. Numerical examples are g