01062nam0-2200349- -450 99000106886020331620220422104825.00-520-21677-6000106886USA01000106886(ALEPH)000106886USA0100010688620020417d2001----km-y0enga50------baengGBa|||z|||001yyExcavations at Nemea IIthe early hellenistic stadiunStephen G. Millerwith contributions by Robert C. Knapp and David ChamberlainsBerkeleyUniversity of California press2001XXI, 385 p.30 cmNemeaGreciaGreciaScavi archeologici938.8MILLER,Stephen G.153552KNAPP,Robert C.CHAMBERLAIN,DavidITSalbcISBD990001068860203316XI.3.B. 116/2(X B 446)161006 L.M.X B00079333BKUMAExcavations at Nemea II2832257UNISA02897nam 2200481 450 99641819960331620210313090136.0981-15-8659-410.1007/978-981-15-8659-0(CKB)4100000011568959(DE-He213)978-981-15-8659-0(MiAaPQ)EBC6455935(PPN)252505352(EXLCZ)99410000001156895920210313d2020 uy 0engurnn|008mamaatxtrdacontentcrdamediacrrdacarrierA first course in linear models and design of experiments /N. R. Mohan Madhyastha, S. Ravi, A. S. Praveena1st ed. 2020.Singapore :Springer,[2020]©20201 online resource (XIV, 230 p. 26 illus.) Includes index.981-15-8658-6 Linear Estimation -- Linear Hypotheses and Their Tests -- Block Designs -- Row-Column Designs -- Factorial Experiments -- Analysis of Covariance -- Missing Plot Technique -- Split Plot Design.This textbook presents the basic concepts of linear models, design and analysis of experiments. With the rigorous treatment of topics and provision of detailed proofs, this book aims at bridging the gap between basic and advanced topics of the subject. Initial chapters of the book explain linear estimation in linear models and testing of linear hypotheses, and the later chapters apply this theory to the analysis of specific models in designing statistical experiments. The book includes topics on the basic theory of linear models covering estimability, criteria for estimability, Gauss–Markov theorem, confidence interval estimation, linear hypotheses and likelihood ratio tests, the general theory of analysis of general block designs, complete and incomplete block designs, general row column designs with Latin square design and Youden square design as particular cases, symmetric factorial experiments, missing plot technique, analyses of covariance models, split plot and split block designs. Every chapter has examples to illustrate the theoretical results and exercises complementing the topics discussed. R codes are provided at the end of every chapter for at least one illustrative example from the chapter enabling readers to write similar codes for other examples and exercise.Linear models (Statistics)Experimental designLinear models (Statistics)Experimental design.519.5Madhyastha N. R. Mohan978509Praveena A. S.MiAaPQMiAaPQMiAaPQBOOK996418199603316A first course in linear models and design of experiments2230337UNISA05324nam 22006974a 450 991078496540332120230829003031.01-281-91924-19786611919245981-277-400-9(CKB)1000000000409735(EBL)1681644(OCoLC)879025571(SSID)ssj0000206777(PQKBManifestationID)11206841(PQKBTitleCode)TC0000206777(PQKBWorkID)10235206(PQKB)10899777(MiAaPQ)EBC1681644(WSP)00006063(Au-PeEL)EBL1681644(CaPaEBR)ebr10201347(CaONFJC)MIL191924(EXLCZ)99100000000040973520060511d2006 uy 0engur|n|---|||||txtccrMultiplicative inequalities of Carlson type and interpolation /Leo Larsson, Lech Maligranda, Josip Pečarić, Lars-Erik PerssonSingapore World Scientific20061 online resource (217 p.)Description based upon print version of record.981-256-708-9 Includes bibliographical references (p. 193-197) and index.Contents ; Preface ; 0. Introduction and Notation ; 0.1 Notational Conventions ; 0.1.1 Indices and Exponents ; 0.1.2 Constants ; 0.1.3 Measure Spaces and Related Spaces ; 0.1.4 Interpolation Spaces ; 0.1.5 Linear Mappings Between Normed Spaces ; 0.1.6 Other1. Carlson's Inequalities 1.1 Carlson's Proof ; 1.2 Hardy's Proofs ; 1.3 An Alternate Proof ; 1.4 Carlson's Inequality for Finite Sums ; 2. Some Extensions and Complements of Carlson's Inequalities ; 2.1 Gabriel ; 2.2 Levin ; 2.3 Caton ; 2.4 Bellman2.5 Two Discrete Carlson By-products 2.6 Landau and Levin-Steckin ; 2.7 Some Extensions of the Landau and Levin-Steckin Inequalities ; 2.7.1 The Case p = 1 ; 2.7.2 General p ; 2.8 Proofs ; 2.9 Levin-Godunova ; 2.10 More About Finite Sums ; 3. The Continuous Case ; 3.1 Beurling3.2 Kjellberg 3.3 Bellman ; 3.4 Sz. Nagy ; 3.5 Klefsjo ; 3.6 Hu ; 3.7 Yang-Fang ; 3.8 A Continuous Landau Type Inequality ; 3.9 Integrals on Bounded Intervals ; 4. Levin's Theorem ; 5. Some Multi-dimensional Generalizations and Variations ; 5.1 Some Preliminaries5.2 A Sharp Inequality for Cones in Rn 5.3 Some Variations on the Multi-dimensional Theme ; 5.3.1 Kjellberg Revisited ; 5.3.2 Andrianov ; 5.3.3 Pigolkin ; 5.3.4 Bertolo-Fernandez ; 5.3.5 Barza et al ; 5.3.6 Kamaly ; 5.4 Some Further Generalizations5.4.1 A Multi-dimensional Extension of Theorem 3.6Collecting all the results on the particular types of inequalities, the coverage of this book is unique among textbooks in the literature. The book focuses on the historical development of the Carlson inequalities and their many generalizations and variations. As well as almost all known results concerning these inequalities and all known proof techniques, a number of open questions suitable for further research are considered. Two chapters are devoted to clarifying the close connection between interpolation theory and this type of inequality. Other applications are also included, in additionInequalities (Mathematics)InterpolationNumerical analysisInequalities (Mathematics)Interpolation.Numerical analysis.515/.26Larsson Leo1972-739596Maligranda Lech1552366Pečarić Josip E59649Persson Lars Erik1944-149302MiAaPQMiAaPQMiAaPQBOOK9910784965403321Multiplicative inequalities of Carlson type and interpolation3812201UNINA