00996nam0-22003251i-450-99000144871040332120110504164503.00-201-31128-3000144871FED01000144871(Aleph)000144871FED0100014487120001205d1997----km-y0itay50------baengIntroductory differential equationsfrom linearity to chaosEric J. Kostelich, Dieter ArmbrusterReading. MassachusettsAddison-Wesleyc1997vi, 83 p.28 cmmathematica lab manualin collaboration with Math Everywhere Inc.Equazioni differenziali515.35Kostelich,Eric J.22152Armbruster,DieterITUNINARICAUNIMARCBK990001448710403321515.35-KOS-1598SC1SC1Introductory differential equations374320UNINA00899nam0-22002891i-450 99000176138040332120190529131357.0000176138FED01000176138(Aleph)000176138FED0100017613820030910d1967----km-y0itay50------baeng<<The >>distribution of quadratic forms on normal random variablesBruno BaldessariRoma[s.n.]1967p. 1700-170425 cmEstr. da : The Annals of Mathematical Statistics, 38,1967.Calcolo delle probabilità519.2Baldessari,Bruno76557ITUNINARICAUNIMARCLG99000176138040332160 OP. 74/4143113FAGBCFAGBCDistribution of quadratic forms on normal random variables362682UNINA01237nam a2200289 i 450099100223551970753620020508192748.0981005s1987 it ||| | ita 8876420290b10979049-39ule_instPARLA157809ExLDip.to Scienze dell'AntichitàitaitalatHenricus :de Hervordia162564Catena aurea entium :tabula quaestionum 1.-7. /Enrico di Herford ; a cura di Loris SturlesePisa :Scuola Normale Superiore,1987XXVII, 195 p. ;24 cm.Centro di cultura medievale ;2Sturlese, Loris.b1097904923-02-1728-06-02991002235519707536LE007 189 HER 01.0112015000021861le007-E0.00-l- 01010.i1109145928-06-02LE007 189 HER 01.0122007000150634le007gE30.00-l- 021720.i1482354809-09-08LE005 189 HEN01. STU01. 0112005000139321le005-E0.00-l- 00000.i1256751622-09-03Catena aurea entium485346UNISALENTO(2)le007le00501-01-98ma -itait 0303662nam 2200649Ia 450 991078508770332120200520144314.01-281-11631-997866111163163-540-74011-210.1007/978-3-540-74011-7(CKB)1000000000410955(EBL)372430(OCoLC)300972636(SSID)ssj0000215749(PQKBManifestationID)11175809(PQKBTitleCode)TC0000215749(PQKBWorkID)10193973(PQKB)10591687(DE-He213)978-3-540-74011-7(MiAaPQ)EBC372430(Au-PeEL)EBL372430(CaPaEBR)ebr10203905(CaONFJC)MIL111631(PPN)12316852X(EXLCZ)99100000000041095520070801e20081978 uy 0engur|n|---|||||txtccrOptimal stopping rules[electronic resource] /A.N. Shiryaev ; translated by A.B. Aries1st ed. 2008.Berlin ;New York Springerc20081 online resource (227 p.)Applications of mathematics,0172-4568 ;8"Reprint of the 1978 edition with a new preface."3-540-74010-4 Includes bibliographical references (p. 208-213) and index.Random Processes: Markov Times -- Optimal Stopping of Markov Sequences -- Optimal Stopping of Markov Processes -- Some Applications to Problems of Mathematical Statistics.Although three decades have passed since first publication of this book reprinted now as a result of popular demand, the content remains up-to-date and interesting for many researchers as is shown by the many references to it in current publications. The "ground floor" of Optimal Stopping Theory was constructed by A.Wald in his sequential analysis in connection with the testing of statistical hypotheses by non-traditional (sequential) methods. It was later discovered that these methods have, in idea, a close connection to the general theory of stochastic optimization for random processes. The area of application of the Optimal Stopping Theory is very broad. It is sufficient at this point to emphasise that its methods are well tailored to the study of American (-type) options (in mathematics of finance and financial engineering), where a buyer has the freedom to exercise an option at any stopping time. In this book, the general theory of the construction of optimal stopping policies is developed for the case of Markov processes in discrete and continuous time. One chapter is devoted specially to the applications that address problems of the testing of statistical hypotheses, and quickest detection of the time of change of the probability characteristics of the observable processes. The author, A.N.Shiryaev, is one of the leading experts of the field and gives an authoritative treatment of a subject that, 30 years after original publication of this book, is proving increasingly important.Applications of mathematics ;8.Optimal stopping (Mathematical statistics)Sequential analysisOptimal stopping (Mathematical statistics)Sequential analysis.519.5/4Shiri͡aev Alʹbert Nikolaevich102058Aries A. B1518867MiAaPQMiAaPQMiAaPQBOOK9910785087703321Optimal stopping rules3756663UNINA