Necessary and sufficient conditions for the problem of maximizing or minimizing a function subject to inequality constraints are given by a set of equalities and inequalities known as the Kuhn-Tucker conditions. These conditions can provide an analytic solution to the optimization problem if the artificial variables known as Lagrange multipliers can be eliminated. However, this is tedious to do by hand. This paper develops a computer program to assist in the solution process which combines symbolic computation and automated reasoning techniques. The program may also be useful for other problems involving algebraic reasoning with inequalities which employ general functions or symbolic parameters
on a comparative study of the methods of solving Non-linear programming (NLP) problem. We know that ...
Optimization plainly dominates the design, planning, operation, and c- trol of engineering systems. ...
In this paper, a new augmented Lagrangian function is introduced for solving nonlinear programming p...
In this paper the issue of mathematical programming and optimization has being revisited. The theor...
In this paper the issue of mathematical programming and optimization has being revisited. The theory...
The minimization of a nonlinear function subject to linear and nonlinear equality constraints and si...
The minimization of a nonlinear function subject to linear and nonlinear equality constraints and si...
This paper combines Calculus and Programming to solve constrained optimization problems common in ma...
. This paper proposes a logic-based approach to optimization that combines solution methods from ma...
The talk gives a survey on some symbolic algorithmic methods for solving systems of algebraic equati...
Lagrange multipliers, penalty methods, and Kuhn-Tucker's theory are some important mathematical tool...
URL des Cahiers : https://halshs.archives-ouvertes.fr/CAHIERS-MSEVoir aussi l'article basé sur ce do...
Mathematically, most of the interesting optimization problems can be formulated to optimize some obj...
Since World War II, mathematical programming has steadily increased in solution methods and scope of...
Optimization without Calculus Chapter Summary The Arithmetic Mean-Geometric Mean Inequality An Appli...
on a comparative study of the methods of solving Non-linear programming (NLP) problem. We know that ...
Optimization plainly dominates the design, planning, operation, and c- trol of engineering systems. ...
In this paper, a new augmented Lagrangian function is introduced for solving nonlinear programming p...
In this paper the issue of mathematical programming and optimization has being revisited. The theor...
In this paper the issue of mathematical programming and optimization has being revisited. The theory...
The minimization of a nonlinear function subject to linear and nonlinear equality constraints and si...
The minimization of a nonlinear function subject to linear and nonlinear equality constraints and si...
This paper combines Calculus and Programming to solve constrained optimization problems common in ma...
. This paper proposes a logic-based approach to optimization that combines solution methods from ma...
The talk gives a survey on some symbolic algorithmic methods for solving systems of algebraic equati...
Lagrange multipliers, penalty methods, and Kuhn-Tucker's theory are some important mathematical tool...
URL des Cahiers : https://halshs.archives-ouvertes.fr/CAHIERS-MSEVoir aussi l'article basé sur ce do...
Mathematically, most of the interesting optimization problems can be formulated to optimize some obj...
Since World War II, mathematical programming has steadily increased in solution methods and scope of...
Optimization without Calculus Chapter Summary The Arithmetic Mean-Geometric Mean Inequality An Appli...
on a comparative study of the methods of solving Non-linear programming (NLP) problem. We know that ...
Optimization plainly dominates the design, planning, operation, and c- trol of engineering systems. ...
In this paper, a new augmented Lagrangian function is introduced for solving nonlinear programming p...