01625nam--2200421---450-99000140399020331620090825101742.088-387-3094-6000140399USA01000140399(ALEPH)000140399USA0100014039920040209d2006----km-y0enga50------baitaIT||||||||001yy<<Il>> tecnico dell'ente localemanuale per la preparazione ai concorsi e l'aggiornamento professionale dei tecnici di Comuni, Province, Regioni e Comunità montaneErmete Dalprato, Roberto Maria Brioli8. ed. aggiornata con: D.Lgs. n.163/2006 (codice dei contratti pubblici), Legge n.15/2005 (modifiche legge 241/90), Legge n. 80/2005 (competitività), Legge n. 62/2005 (comunitaria 2004)Santarcangelo di RomagnaMaggioli2006588 p.24 cmConcorsi pubblici192001Concorsi pubblici19EdiliziaLegislazioneManualiUrbanisticaLegislazioneManuali344.45045DALPRATO,Ermete343022BRIOLI,Roberto Maria541860ITsalbcISBD990001403990203316XXI.6. 135 (IG IV 1766 (B))51216 G.XXI.6. 135 (IG IV)00126791BKGIUMARIA1020040209USA011212PATRY9020040406USA011739RENATO9020060706USA011226RSIAV59020090825USA011017Tecnico dell'ente locale881907UNISA03673nam 22005775 450 991048032370332120200704062932.01-4471-3631-410.1007/978-1-4471-3631-6(CKB)2660000000026303(SSID)ssj0000914902(PQKBManifestationID)11562287(PQKBTitleCode)TC0000914902(PQKBWorkID)10883580(PQKB)11727945(DE-He213)978-1-4471-3631-6(MiAaPQ)EBC3074183(PPN)238005852(EXLCZ)99266000000002630320130526d1999 u| 0engurnn|008mamaatxtccrMeasure, Integral and Probability[electronic resource] /by Marek Capinski, (Peter) Ekkehard Kopp1st ed. 1999.London :Springer London :Imprint: Springer,1999.1 online resource (XI, 227 p. 20 illus.) Springer Undergraduate Mathematics Series,1615-2085"With 23 Figures"--Title page.3-540-76260-4 Includes bibliographical references and index.1. Motivation and preliminaries -- 2. Measure -- 3. Measurable functions -- 4. Integral -- 5. Spaces of integrable functions -- 6. Product measures -- 7. Limit theorems -- 8. Solutions to exercises -- 9. Appendix -- References.The central concepts in this book are Lebesgue measure and the Lebesgue integral. Their role as standard fare in UK undergraduate mathematics courses is not wholly secure; yet they provide the principal model for the development of the abstract measure spaces which underpin modern probability theory, while the Lebesgue function spaces remain the main sour ce of examples on which to test the methods of functional analysis and its many applications, such as Fourier analysis and the theory of partial differential equations. It follows that not only budding analysts have need of a clear understanding of the construction and properties of measures and integrals, but also that those who wish to contribute seriously to the applications of analytical methods in a wide variety of areas of mathematics, physics, electronics, engineering and, most recently, finance, need to study the underlying theory with some care. We have found remarkably few texts in the current literature which aim explicitly to provide for these needs, at a level accessible to current under­ graduates. There are many good books on modern prob ability theory, and increasingly they recognize the need for a strong grounding in the tools we develop in this book, but all too often the treatment is either too advanced for an undergraduate audience or else somewhat perfunctory.Springer Undergraduate Mathematics Series,1615-2085ProbabilitiesMathematicsProbability Theory and Stochastic Processeshttps://scigraph.springernature.com/ontologies/product-market-codes/M27004Mathematics, generalhttps://scigraph.springernature.com/ontologies/product-market-codes/M00009Probabilities.Mathematics.Probability Theory and Stochastic Processes.Mathematics, general.515/.42Capinski Marekauthttp://id.loc.gov/vocabulary/relators/aut536472Kopp (Peter) Ekkehardauthttp://id.loc.gov/vocabulary/relators/autBOOK9910480323703321Measure, integral and probability1502462UNINA