06541nam 22007815 450 991043787240332120251030140406.01-283-86508-41-4614-5131-010.1007/978-1-4614-5131-0(CKB)2670000000299666(EBL)1030663(OCoLC)823384959(SSID)ssj0000811539(PQKBManifestationID)11956508(PQKBTitleCode)TC0000811539(PQKBWorkID)10850349(PQKB)10804264(DE-He213)978-1-4614-5131-0(MiAaPQ)EBC1030663(PPN)168302128(EXLCZ)99267000000029966620121205d2013 u| 0engur|n|---|||||txtccrOptimization, Simulation, and Control /edited by Altannar Chinchuluun, Panos M. Pardalos, Rentsen Enkhbat, Efstratios N. Pistikopoulos1st ed. 2013.New York, NY :Springer New York :Imprint: Springer,2013.1 online resource (350 p.)Springer Optimization and Its Applications,1931-6836 ;76Description based upon print version of record.1-4899-8781-9 1-4614-5130-2 Includes bibliographical references.Optimization, Simulation,and Control; Preface; Contents; On the Composition of Convex Envelopes for Quadrilinear Terms; 1 Introduction; 2 Motivation and Literature; 3 The Composition of Convex Envelopes; 3.1 Alphabets, Languages, and Grammars; 3.2 Mathematical Expression Language: Syntax; 3.3 Mathematical Expression Language: Semantics; 3.3.1 Exact Semantics; 3.3.2 Relaxed Semantics; 3.4 Comparison of Relaxed Semantics; 4 Computational Results; 5 Conclusion; References; An Oriented Distance Function Application to Gap Functions for Vector Variational Inequalities; 1 Introduction2 Mathematical preliminaries3 Gap functions for vector variational inequalities; 4 Extension to set-valued problems; 4.1 Vector variational inequalities with set-valued mappings; 4.2 Vector variational-like inequalities with set-valued mappings; 4.3 Generalized vector variational-like inequalities with set-valued mappings; References; Optimal Inscribing of Two Balls into Polyhedral Set; 1 Introduction; 2 Optimal Inscribing of Two Balls; 3 Continuity and Differentiability of Auxiliary Functions; 4 Numerical Examples; ReferencesMathematical Programs with Equilibrium Constraints: A Brief Survey of Methods and Optimality Conditions1 Variational Inequality Problem; 1.1 Existence and Convexity of the Solution Set of VIP; 1.2 Relationship to Other Problems; 1.3 Traffic Equilibrium; 2 Mathematical Programs with Equilibrium Constraints; 3 Methods for Solving the MPEC; 3.1 Penalty Techniques; 3.2 Nondifferential Optimization; 3.3 Smoothing Methods; 4 Optimality Conditions for MPEC; References; Linear Programming with Interval Data: A Two-Level Programming Approach; 1 Introduction; 2 Problem Formulation3 One-Level Transformation3.1 Lower Bound; 3.2 Upper Bound; 3.3 Special Case; 4 An Example; 5 Conclusion; References; Quantifying Retardation in Simulation Based Optimization; 1 Introduction; 2 One-Shot Optimization and Problem Characteristics; 3 The Newton Scenario for Separable Adjoints; 4 Jacobi Method on an Elliptic Problem; 5 Multigrid Method; 6 Summary and Conclusion; References; Evolutionary Algorithm for Generalized Nash Equilibrium Problems; 1 Introduction; 2 Generalized Nash Equilibrium Problem; 3 Equivalent Reformulations; 4 Evolutionary Algorithm; 5 Numerical Experiments6 ConclusionReferences; Scalar and Vector Optimization with Composed Objective Functions and Constraints; 1 Introduction; 2 Notations and Preliminaries; 3 Some Dual Optimization Problems; 3.1 The Scalar Optimization Problem (PS); 3.2 The Scalar Optimization Problem (PSΣ); 3.3 The Vector Optimization Problem (PV); 3.4 The Vector Optimization Problem (PVm); References; A PTAS for Weak Minimum Routing Cost Connected Dominating Set of Unit Disk Graph; 1 Introduction; 2 Problem Transformation; 3 A Constant Approximation; 4 A PTAS; ReferencesPower Control in Wireless Ad Hoc Networks: Stability and Convergence Under UncertaintiesOptimization, simulation and control are very powerful tools in engineering and mathematics, and play an increasingly important role. Because of their various real-world applications in industries such as finance, economics, and telecommunications, research in these fields is accelerating at a rapid pace, and there have been major algorithmic and theoretical developments in these fields in the last decade. This volume brings together the latest developments in these areas of research and presents applications of these results to a wide range of real-world problems. The book is composed of invited contributions by experts from around the world who work to develop and apply new optimization, simulation, and control techniques either at a theoretical level or in practice. Some key topics presented include: equilibrium problems, multi-objective optimization, variational inequalities, stochastic processes, numerical analysis, optimization in signal processing, and various other interdisciplinary applications. This volume can serve as a useful resource for researchers, practitioners, and advanced graduate students of mathematics and engineering working in research areas where results in optimization, simulation and control can be applied.Springer Optimization and Its Applications,1931-6836 ;76Mathematical optimizationSystem theoryControl theoryMathematical modelsOptimizationSystems Theory, ControlMathematical Modeling and Industrial MathematicsMathematical optimization.System theory.Control theory.Mathematical models.Optimization.Systems Theory, Control.Mathematical Modeling and Industrial Mathematics.519.6Chinchuluun Altannar507428MiAaPQMiAaPQMiAaPQBOOK9910437872403321Optimization, simulation, and control4195224UNINA