Linear programming and extensions

In real-world problems related to finance, business, and management, mathematicians and economists frequently encounter optimization problems. In this classic book, George Dantzig looks at a wealth of examples and develops linear programming methods for their solutions. He begins by introducing the basic theory of linear inequalities and describes the powerful simplex method used to solve them. Treatments of the price concept, the transportation problem, and matrix methods are also given, and key mathematical concepts such as the properties of convex sets and linear vector spaces are covered. George Dantzig is properly acclaimed as the "father of linear programming." Linear programming is a mathematical technique used to optimize a situation. It can be used to minimize traffic congestion or to maximize the scheduling of airline flights. He formulated its basic theoretical model and discovered its underlying computational algorithm, the "simplex method," in a pathbreaking memorandum published by the United States Air Force in early 1948. Linear Programming and Extensions provides an extraordinary account of the subsequent development of his subject, including research in mathematical theory, computation, economic analysis, and applications to industrial problems. Dantzig first achieved success as a statistics graduate student at the University of California, Berkeley. One day he arrived for a class after it had begun, and assumed the two problems on the board were assigned for homework. When he handed in the solutions, he apologized to his professor, Jerzy Neyman, for their being late but explained that he had found the problems harder than usual. About six weeks later, Neyman excitedly told Dantzig, "I've just written an introduction to one of your papers. Read it so I can send it out right away for publication." Dantzig had no idea what he was talking about. He later learned that the "homework" problems had in fact been two famous unsolved problems in statistics.

PrefaceCh. 1The Linear Programming ConceptCh. 2Origins and InfluencesCh. 3Formulating a Linear Programming ModelCh. 4Linear Equation and Inequality SystemsCh. 5The Simplex MethodCh. 6Proof of the Simplex Algorithm and the Duality TheoremCh. 7The Geometry of Linear ProgramsCh. 8Pivoting, Vector Spaces, Matrices, and InversesCh. 9The Simplex Method Using MultipliersCh. 10Finiteness of the Simplex Method Under PerturbationCh. 11Variants of the Simplex AlgorithmCh. 12The Price Concept in Linear ProgrammingCh. 13Games and Linear ProgramsCh. 14The Classical Transportation ProblemCh. 15Optimal Assignment and Other Distribution ProblemsCh. 16The Transshipment ProblemCh. 17Networks and the Transshipment ProblemCh. 18Variables with Upper BoundsCh. 19Maximal Flows in NetworksCh. 20The Primal-Dual Method for Transportation ProblemsCh. 21The Weighted Distribution ProblemCh. 22Programs with Variable CoefficientsCh. 23A Decomposition Principle for Linear ProgramsCh. 24Convex ProgrammingCh. 25UncertaintyCh. 26Discrete Variable Extremum ProblemsCh. 27Stigler's Nutrition Model: An Example of Formulation and SolutionCh. 28The Allocation of Aircraft to Routes Under Uncertain DemandBibliographyIndex