Advances on Mathematical Modeling and Optimization with Its Applications discusses optimization, equality, and inequality constraints and their application in the versatile optimizing domain. It further covers non-linear optimization methods such as global optimization, and gradient-based non-linear optimization, and their applications.



Discusses important topics including multi-component differential equations, geometric partial differential equations, and computational neural systems
Covers linear integer programming and network design problems, along with an application of the mixed integer problems
Discusses constrained and unconstrained optimization, equality, and inequality constraints, and their application in the versatile optimizing domain
Elucidates the application of statistical models, probability models, and transfer learning concepts
Showcases the importance of multi-attribute decision modeling in the domain of image processing and soft computing

The text is primarily for senior undergraduate and graduate students, and academic researchers in the fields of mathematics, statistics, and computer science.