05739cam a2200553Ki 4500001001300000003000600013005001700019006001900036007001500055008004100070040020300111020003600314020003300350020001500383020001800398020001800416035005700434050001000491072002500501072002500526082001200551100003300563245013800596264003700734300002200771336002600793337002600819338003600845504005100881588009000932505056801022505055001590505060302140505059502743505061003338505003303948520060303981650004204584650002204626650003704648650006004685650004804745650006804793655002204861655002904883700003004912776016804942856007505110ocn903488788OCoLC20190328114810.0m     o  d        cr cnu|||unuuu150216s2015    enk     ob    001 0 eng d  aN$TbengerdaepncN$TdOPELSdN$TdE7BdOCLCFdYDXCPdUMIdEBLCPdDEBSZdOCLCOdB24X7dCOOdDEBBGdIDBdVGMdOCLCQdK6UdMERUCdU3WdD6HdCEFdOCLCAdAU@dOCLCQdTKNdCUYdLOAdZCUdICGdCOCUFdDKC  a9780128024867q(electronic bk.)  a0128024860q(electronic bk.)  a0128022124  a9780128022122  z9780128022122  a(OCoLC)903488788z(OCoLC)903858628z(OCoLC)913971952 4aQA402 7aSCIx0640002bisacsh 7aTECx0290002bisacsh04a0032231 aObzherin, Yuriy E.,eauthor.10aSemi-markov models : control of restorable systems with latent failures / h[electronic resource]cYuriy E. Obzherin, Elena G. Boyko. 1aLondon :bAcademic Press,c2015.  a1 online resource  atextbtxt2rdacontent  acomputerbc2rdamedia  aonline resourcebcr2rdacarrier  aIncludes bibliographical references and index.0 aOnline resource; title from PDF title page (ScienceDirect, viewed February 16, 2015).0 aCover; Title page; Copyright Page; Contents; Preface; List of Notations and Abbreviations; Introduction; Chapter 1 -- Preliminaries; 1.1 -- Strategies and characteristics of technical Control; 1.2 -- Preliminaries on renewal theory; 1.3 -- Preliminaries on semi-Markov processes with arbitrary phase space of states; Chapter 2 -- Semi-Markov Models of One-Component Systems with Regard to Control of Latent Failures; 2.1 -- The System Model With Component Deactivation While Control Execution; 2.1.1 -- The System Description; 2.1.2 -- Semi-Markov Model Building.8 a2.1.3 -- Definition of EMC Stationary Distribution2.1.4 -- Stationary Characteristics Definition; 2.2 -- The System Model Without Component Deactivation While Control Execution; 2.2.1 -- The System Description; 2.2.2 -- Semi-Markov Model Building; 2.2.3 -- Definition of EMC Stationary Distribution; 2.2.4 -- Stationary Characteristics Definition; 2.3 -- Approximation of Stationary Characteristics of One-Component System Without Component Deactivation; 2.3.1 -- System Description; 2.3.2 -- Semi-Markov Model Building of the Supporting System.8 a2.3.3 -- Definition of EMC Stationary Distribution for Supporting System2.3.4 -- Approximation of the System Stationary Characteristics; 2.4 -- The System Model With Component Deactivation and Possibility of Control Errors; 2.4.1 -- System Description; 2.4.2 -- Semi-Markov Model Building; 2.4.3 -- Definition of EMC Stationary Distribution; 2.4.4 -- System Stationary Characteristics Definition; 2.5 -- The System Model With Component Deactivation and Preventive Restoration; 2.5.1 -- System Description; 2.5.2 -- Semi-Markov model building; 2.5.3 -- Definition of the EMC Stationary Distribution.8 a2.5.4 -- Definition of the System Stationary CharacteristicsChapter 3 -- Semi-Markov Models of Two-Component Systems with Regard to Control of Latent Failures; 3.1 -- The Model of Two-Component Serial System with Immediate Control and Restoration; 3.1.1 -- System Description; 3.1.2 -- Semi-Markov Model Building; 3.1.3 -- Definition of EMC Stationary Distribution; 3.1.4 -- Stationary Characteristics Definition; 3.2 -- The Model of Two-Component Parallel System with Immediate Control and Restoration; 3.2.1 -- System Description; 3.2.2 -- Definition of System Stationary Characteristics.8 a3.3 -- The Model of Two-Component Serial System with Components Deactivation while Control Execution, the Distribution of Co ... 3.3.1 -- System Description; 3.3.2 -- Semi-Markov Model Building; 3.3.3 -- Definition of EMC Stationary Distribution; 3.3.4 -- Stationary Characteristics Definition; 3.4 -- The Model of Two-Component Parallel System with Components Deactivation While Control Execution, the Distribution of ... ; 3.4.1 -- Definition of EMC Stationary Distribution; 3.5 -- Approximation of Stationary Characteristics of Two-Component Serial Systems with Components Deactivation while Contro ...8 a3.5.1 -- System Description.  aFeaturing previously unpublished results, Semi-Markov Models: Control of Restorable Systems with Latent Failures describes valuable methodology which can be used by readers to build mathematical models of a wide class of systems for various applications. In particular, this information can be applied to build models of reliability, queuing systems, and technical control. Beginning with a brief introduction to the area, the book covers semi-Markov models for different control strategies in one-component systems, defining their stationary characteristics of reliability and efficiency, and uti. 0aSystem analysisxMathematical models. 0aMarkov processes. 7aSCIENCExSystem Theory.2bisacsh 7aTECHNOLOGY & ENGINEERINGxOperations Research.2bisacsh 7aMarkov processes.2fast0(OCoLC)fst01010347 7aSystem analysisxMathematical models.2fast0(OCoLC)fst01141393 4aElectronic books. 7aElectronic books.2lcgft1 aBoyko, Elena G.,eauthor.08iPrint version:aObzherin, Yuriy E.tSemi-Markov Models : Control of Restorable Systems with Latent Failures.dBurlington : Elsevier Science, �2015z9780128022122403ScienceDirectuhttp://www.sciencedirect.com/science/book/9780128022122