An existence result for noncoercive nonconvex problems in the calculus of variations

## Communicated by G. F. Roach A numerical technique for determining the solution of the brachistochrone problem is presented. The brachistochrone problem is first formulated as a non-linear optimal control problem. Using Chebyshev nodes, we construct the Mth degree polynomial interpolation to ap

The book by Bolza, in fact, became so popular that the fixed-endpoint problem we stated became known as the article no. 0162

This paper has two main ideas. The first idea is that constrained problems in optimal control theory and the calculus of variations can be associated with unconstrained calculus of variations problems by using multipliers. This allows us to obtain a true Lagrange multiplier rule where both the origi

This paper has two main ideas. The first idea is that general constrained problems with delay in the calculus of variations can be associated with unconstrained calculus of variations problems by using multipliers. This allows us to obtain a true Lagrange multiplier rule where the original variables