AbstractThe efficiency and effectiveness of most optimization algorithms hinges on the numerical linear algebra algorithms that they utilize. Effective linear algebra is crucial to their success, and because of this, optimization applications have motivated fundamental advances in numerical linear algebra. This essay will highlight contributions of numerical linear algebra to optimization, as well as some optimization problems encountered within linear algebra that contribute to a symbiotic relationship
Algorithmic Principles of Mathematical Programming investigates the mathematical structures and prin...
Many problems in the sciences and engineering can be rephrased as optimization problems on matrix se...
We argue for the benefits of relations over functions for modelling programs, and even more so for m...
The efficiency and effectiveness of most optimization algorithms hinges on the numerical linear alge...
AbstractThe efficiency and effectiveness of most optimization algorithms hinges on the numerical lin...
Emphasizing practical understanding over the technicalities of specific algorithms, this elegant tex...
Parallel computing research in the area of nonlinear optimization has been extremely intense during ...
Focuses on mathematical structure, and on real-world applications. This book includes developments i...
This book aims to illustrate with practical examples the applications of linear optimization techniq...
Linear algebra occupies a central place in modern mathematics. Also, it is a beautiful and mature fi...
This book is intended as a text covering the central concepts of practical optimization techniques. ...
Computational optimization is ubiquitous in many applications in engineering and industry. In this c...
The purpose of optimization is to maximize the quality of lives, productivity in time, as well as in...
Combinatorial optimization constitutes one specific class of problems. The word combinatorial is der...
AbstractThe increasing availability of advanced-architecture computers has a significant effect on a...
Algorithmic Principles of Mathematical Programming investigates the mathematical structures and prin...
Many problems in the sciences and engineering can be rephrased as optimization problems on matrix se...
We argue for the benefits of relations over functions for modelling programs, and even more so for m...
The efficiency and effectiveness of most optimization algorithms hinges on the numerical linear alge...
AbstractThe efficiency and effectiveness of most optimization algorithms hinges on the numerical lin...
Emphasizing practical understanding over the technicalities of specific algorithms, this elegant tex...
Parallel computing research in the area of nonlinear optimization has been extremely intense during ...
Focuses on mathematical structure, and on real-world applications. This book includes developments i...
This book aims to illustrate with practical examples the applications of linear optimization techniq...
Linear algebra occupies a central place in modern mathematics. Also, it is a beautiful and mature fi...
This book is intended as a text covering the central concepts of practical optimization techniques. ...
Computational optimization is ubiquitous in many applications in engineering and industry. In this c...
The purpose of optimization is to maximize the quality of lives, productivity in time, as well as in...
Combinatorial optimization constitutes one specific class of problems. The word combinatorial is der...
AbstractThe increasing availability of advanced-architecture computers has a significant effect on a...
Algorithmic Principles of Mathematical Programming investigates the mathematical structures and prin...
Many problems in the sciences and engineering can be rephrased as optimization problems on matrix se...
We argue for the benefits of relations over functions for modelling programs, and even more so for m...