Direct methods in the calculus of variations

The purpose of this paper is to calculate the first variation of capacity and of the lowest eigenvalue for the Dirichlet problem in convex domains in R N . These formulas are well known in the smooth case and are due to Poincare and Hadamard, respectively. The point is to prove them in sufficient ge

Calculus of Variations: Fundamentals ### 9.1 Historical Background The calculus of variations was first found in the late 17th century soon after calculus was invented. The main figures involved are Newton, the two Bernoulli brothers, Euler, Lagrange, Legendre, and Jacobi. Isaac Newton (1642-1727

In this paper a direct method for solving variational problems using nonclassical parameterization is presented. A nonclassical parameterization based on nonclassical orthogonal polynomials is first introduced to reduce a variational problem to a nonlinear mathematical programming problem. Then, usi