Optimization models /
Calafiore, Giuseppe, 1969-
Optimization models / Giuseppe C. Calafiore, Politecnico di Torino, Laurent El Ghaoui, University of California, Berkeley. - xvii, 631 pages : illustrations ; 26 cm
Includes bibliographical references and index.
Introduction -- I: Linear algebra models -- Vectors and functions -- Matrices -- Symmetric matrices -- Singular value decomposition -- Linear equations and least squares -- Matrix algorithms -- II: Convex optimization models -- Convexity -- Linear, quadratic, and geometric models -- Second-order cone robust models -- Semidefinite models -- Introduction to algorithms -- III: Applications -- Learning from data -- Computational finance -- Control problems -- Engineering design.
Emphasizing practical understanding over the technicalities of specific algorithms, this elegant textbook is an accessible introduction to the field of optimization, focusing on powerful and reliable convex optimization techniques. Students and practitioners will learn how to recognize, simplify, model and solve optimization problems - and apply these principles to their own projects. A clear and self-contained introduction to linear algebra demonstrates core mathematical concepts in a way that is easy to follow, and helps students to understand their practical relevance. Requiring only a basic understanding of geometry, calculus, probability and statistics, and striking a careful balance between accessibility and rigor, it enables students to quickly understand the material, without being overwhelmed by complex mathematics. Accompanied by numerous end-of-chapter problems, an online solutions manual for instructors, and relevant examples from diverse fields including engineering, data science, economics, finance, and management, this is the perfect introduction to optimization for undergraduate and graduate students. --
9781107050877 1107050871
2015301842
GBB477348 bnb GBB488669 bnb
016801304 Uk 016831165 Uk
Mathematical optimization.
Convex sets.
Convex functions.
Convex functions.
Convex sets.
Mathematical optimization.
QA402.5 / .C35 2014
Optimization models / Giuseppe C. Calafiore, Politecnico di Torino, Laurent El Ghaoui, University of California, Berkeley. - xvii, 631 pages : illustrations ; 26 cm
Includes bibliographical references and index.
Introduction -- I: Linear algebra models -- Vectors and functions -- Matrices -- Symmetric matrices -- Singular value decomposition -- Linear equations and least squares -- Matrix algorithms -- II: Convex optimization models -- Convexity -- Linear, quadratic, and geometric models -- Second-order cone robust models -- Semidefinite models -- Introduction to algorithms -- III: Applications -- Learning from data -- Computational finance -- Control problems -- Engineering design.
Emphasizing practical understanding over the technicalities of specific algorithms, this elegant textbook is an accessible introduction to the field of optimization, focusing on powerful and reliable convex optimization techniques. Students and practitioners will learn how to recognize, simplify, model and solve optimization problems - and apply these principles to their own projects. A clear and self-contained introduction to linear algebra demonstrates core mathematical concepts in a way that is easy to follow, and helps students to understand their practical relevance. Requiring only a basic understanding of geometry, calculus, probability and statistics, and striking a careful balance between accessibility and rigor, it enables students to quickly understand the material, without being overwhelmed by complex mathematics. Accompanied by numerous end-of-chapter problems, an online solutions manual for instructors, and relevant examples from diverse fields including engineering, data science, economics, finance, and management, this is the perfect introduction to optimization for undergraduate and graduate students. --
9781107050877 1107050871
2015301842
GBB477348 bnb GBB488669 bnb
016801304 Uk 016831165 Uk
Mathematical optimization.
Convex sets.
Convex functions.
Convex functions.
Convex sets.
Mathematical optimization.
QA402.5 / .C35 2014