01121nam0 22002651i 450 SUN002291720040907120000.020040907d1991 |0itac50 baitaIT|||| |||||Bambini che non vogliono viverecome capire e prevenire le situazioni estremeIsrael Orbachpresentazione di Giovanni Bolleatraduzione di Laura De Rosa FirenzeGiunti1991IX, 282 p.25 cm.001SUN00216762001 Grandangolo210 FirenzeGiunti.FirenzeSUNL000014Orbach, IsraelSUNV019102526579Bollea, GiovanniSUNV019103GiuntiSUNV000036650ITSOL20181109RICASUN0022917UFFICIO DI BIBLIOTECA DEL DIPARTIMENTO DI PSICOLOGIA16 CONS 579 16 VS 2128 UFFICIO DI BIBLIOTECA DEL DIPARTIMENTO DI PSICOLOGIAIT-CE0119VS2128CONS 579caBambini che non vogliono vivere819967UNICAMPANIA01273nam0 2200289 i 450 SUN005426520180409114137.868978-03-87976-20-40.0003-87976-20-520061008d1991 |0engc50 baengUS|||| |||||A *history of inverse probabilityfrom Thomas Bayes to Karl PearsonAndrew I. DaleNew YorkSpringer 1991XXIV, 652 p.ill.24 cm.001SUN00502032001 *Studies in the history of mathematics and physical sciences16210 BerlinSpringer1975-1991.01-XXHistory and biography [MSC 2020]MFSUNC021469USNew YorkSUNL000011Dale, Andrew I.SUNV04288959582SpringerSUNV000178650ITSOL20200921RICA/sebina/repository/catalogazione/documenti/Dale - A history of inverse probability from Thomas Bayes to Karl Pearson.pdfContentsSUN0054265UFFICIO DI BIBLIOTECA DEL DIPARTIMENTO DI MATEMATICA E FISICA08PREST 01-XX 1002 08 3457 I 20061008 History of inverse probability79012UNICAMPANIA05407nam 2200673 450 991078799430332120230328222707.01-383-02422-70-19-103720-60-19-158333-2(CKB)2670000000545495(EBL)1657778(SSID)ssj0001216221(PQKBManifestationID)11704111(PQKBTitleCode)TC0001216221(PQKBWorkID)11190870(PQKB)10817188(Au-PeEL)EBL1657778(CaPaEBR)ebr10851001(CaONFJC)MIL584413(OCoLC)875098009(Au-PeEL)EBL7034662(MiAaPQ)EBC1657778(EXLCZ)99267000000054549520140402e20052003 uy 0engur|n|---|||||txtccrIntroduction to complex analysis /H. A. PriestleySecond edition.Oxford, England :Oxford University Press,2005.©20031 online resource (343 p.)Description based upon print version of record.0-19-852561-3 0-19-852562-1 Includes bibliographical references and index.Cover; Contents; Notation and terminology; 1. The complex plane; Complex numbers; Algebra in the complex plane; Conjugation, modulus, and inequalities; Exercises; 2. Geometry in the complex plane; Lines and circles; The extended complex plane and the Riemann sphere; Möbius transformations; Exercises; 3. Topology and analysis in the complex plane; Open sets and closed sets in the complex plane; Convexity and connectedness; Limits and continuity; Exercises; 4. Paths; Introducing curves and paths; Properties of paths and contours; Exercises; 5. Holomorphic functionsDifferentiation and the Cauchy-Riemann equationsHolomorphic functions; Exercises; 6. Complex series and power series; Complex series; Power series; A proof of the Differentiation theorem for power series; Exercises; 7. A cornucopia of holomorphic functions; The exponential function; Complex trigonometric and hyperbolic functions; Zeros and periodicity; Argument, logarithms, and powers; Holomorphic branches of some simple multifunctions; Exercises; 8. Conformal mapping; Conformal mapping; Some standard conformal mappings; Mappings of regions by standard mappings; Building conformal mappingsExercises9. Multifunctions; Branch points and multibranches; Cuts and holomorphic branches; Exercises; 10. Integration in the complex plane; Integration along paths; The Fundamental theorem of calculus; Exercises; 11. Cauchy's theorem: basic track; Cauchy's theorem; Deformation; Logarithms again; Exercises; 12. Cauchy's theorem: advanced track; Deformation and homotopy; Holomorphic functions in simply connected regions; Argument and index; Cauchy's theorem revisited; Exercises; 13. Cauchy's formulae; Cauchy's integral formula; Higher-order derivatives; Exercises14. Power series representationIntegration of series in general and power series in particular; Taylor's theorem; Multiplication of power series; A primer on uniform convergence; Exercises; 15. Zeros of holomorphic functions; Characterizing zeros; The Identity theorem and the Uniqueness theorem; Counting zeros; Exercises; 16. Holomorphic functions: further theory; The Maximum modulus theorem; Holomorphic mappings; Exercises; 17. Singularities; Laurent's theorem; Singularities; Meromorphic functions; Exercises; 18. Cauchy's residue theorem; Residues and Cauchy's residue theoremCalculation of residuesExercises; 19. A technical toolkit for contour integration; Evaluating real integrals by contour integration; Inequalities and limits; Estimation techniques; Improper and principal-value integrals; Exercises; 20. Applications of contour integration; Integrals of rational functions; Integrals of other functions with a finite number of poles; Integrals involving functions with infinitely many poles; Integrals involving multifunctions; Evaluation of definite integrals: overview (basic track); Summation of series; Further techniques; Exercises; 21. The Laplace transformBasic properties and evaluation of Laplace transformsComplex analysis is a classic and central area of mathematics, which is studied and exploited in a range of important fields, from number theory to engineering. Introduction to Complex Analysis was first published in 1985, and for this much awaited second edition the text has been considerably expanded, while retaining the style of the original. More detailed presentation is given of elementary topics, to reflect the knowledge base of current students. Exercise sets have beensubstantially revised and enlarged, with carefully graded exercises at the end of each chapter.This is the latest additiMathematical analysisFunctions of complex variablesMathematical analysis.Functions of complex variables.515.9Priestley H. A(Hilary A.),246852MiAaPQMiAaPQMiAaPQBOOK9910787994303321Introduction to complex analysis622573UNINA