03629nam 2200577 a 450 991080707810332120240410191146.097866102013270-306-47648-71-280-20132-0(CKB)1000000000007601(MiAaPQ)EBC197211(MiAaPQ)EBC3035819(Au-PeEL)EBL197211(OCoLC)70721918(Au-PeEL)EBL3035819(CaPaEBR)ebr10060504(CaONFJC)MIL20132(PPN)237936054(EXLCZ)99100000000000760120020523d2002 uy 0engurcnu||||||||txtrdacontentcrdamediacrrdacarrierStochastic and global optimization[electronic resource] /edited by Gintautus Dzemyda, Vydunas Saltenis, Antanas Zilinskas1st ed.Dordrecht London Kluwer Academicc20021 online resource (250 pages)Nonconvex optimization and its applications ;v. 591-4020-0484-2 Includes bibliographical references.Preliminaries -- TABLE OF CONTENTS -- THE JUBILEE OF PROF.DR.HABIL.JONAS MOCKUS -- Chapter 1 TOPOGRAPHICAL DIFFERENTIAL EVOLUTION USING PRE-CALCULATED DIFFERENTIALS -- Chapter 2 OPTIMAL TAX DEPRECIATION IN STOCHASTIC INVESTMENT MODEL -- Chapter 3 GLOBAL OPTIMISATION OF CHEMICAL PROCESS FLOWSHEETS -- Chapter 4 ONE-DIMENSIONAL GLOBAL OPTIMIZATION BASED ON STATISTICAL MODELS -- Chapter 5 ANIMATED VISUAL ANALYSIS OF EXTREMAL PROBLEMS -- Chapter 6 TEST PROBLEMS FOR LIPSCHITZ UNIVARIATE GLOBAL OPTIMIZATION WITH MULTIEXTREMAL CONSTRAINTS -- Chapter 7 NUMERICAL TECHNIQUES IN APPLIED MULTISTAGE STOCHASTIC PROGRAMMING -- Chapter 8 ON THE EFFICIENCY AND EFFECTIVENESS OFCONTROLLED RANDOM SEARCH -- Chapter 9 DISCRETE BACKTRACKING ADAPTIVE SEARCH FOR GLOBAL OPTIMIZATION -- Chapter 10 PARALLEL BRANCH-AND-BOUND ATTRACTION METHODS FOR GLOBAL OPTIMIZATION -- Chapter 11 ON SOLUTION OF STOCHASTIC LINEAR PROGRAMS BY DISCRETIZATION METHODS -- Chapter 12 THE STRUCTURE OF MULTIVARIATE MODELS AND THE RANGE OF DEFINITION -- Chapter 13 OPTIMALITY CRITERIA FOR INVESTMENT PROJECTS UNDER UNCERTAINTY.This volume is dedicated to the 70th birthday of Professor J. Mockus, whose scientific interests include theory and applications of global and discrete optimization, and stochastic programming. The papers for the book were selected because they relate to these topics and also satisfy the criterion of theoretical soundness combined with practical applicability. In addition, the methods for statistical analysis of extremal problems are covered. Although statistical approach to global and discrete optimization is emphasized, applications to optimal design and to mathematical finance are also presented. The results of some subjects (for example, statistical models based on one-dimensional global optimization) are summarized and the prospects for developments are justified.Nonconvex optimization and its applications ;v. 59.Mathematical optimizationStochastic processesMathematical optimization.Stochastic processes.519.3Dzemyda Gintautas1063020Saltenis Vydunas1657943Zhilinskas A1657944MiAaPQMiAaPQMiAaPQBOOK9910807078103321Stochastic and global optimization4011674UNINA