TITLE:
Computational Resolution of a Boolean Equation of 21 Variables
AUTHORS:
Esther Claudine Bitye Mvondo
KEYWORDS:
Alpha-Dense Curves, Boolean Equations, Diophantine Equations, Global Optimization, and Operational Research
JOURNAL NAME:
American Journal of Operations Research,
Vol.12 No.5,
August
31,
2022
ABSTRACT: The Alienor method has been elaborated at the
beginning of the 1980s by Yves Cherruault and Arthur Guillez (1983). The following people have also greatly contributed
to the improvement of this new optimization method: Blaise Somé, Gaspar Mora,
Balira Konfé, Jean Claude Mazza and Esther Claudine Bityé Mvondo. The basic
idea consists in using a reducing transformation allowing us to simplify a
multivariable optimization problem to a new optimization problem according to a
single variable. The rational gestion of enterprises leads generally
to the use of Operational Research, often called management science. The term
Operational Research means a scientific approach to decision making, that seeks
optimization in a system. Consequently, it is better to take the right
decisions. Otherwise, fatal consequences can occur instantaneously [1]. Generally, we have to maximize the global profit
margin, taking into account some constraints. For instance, in an integer
programming problem, some or all the variables are required to be nonnegative
integers. In this paper, we present new reducing transformations for global
optimization in integer, binary and mixed variables as well as the applications
in Boolean algebra by solving a Boolean Equation of 21 variables. The
applications in Operational Research are presented on various examples,
resolved by using the tabulator Excel of Microsoft.