01053nam0 2200289 450 00001927120081113112328.020081113d1979----km-y0itay50------bafreFRy-------001yyLunettes et telescopesthéorie, conditions d'emploi, description, réglagepar Andrè Danjon, Andrè Couderpréface de A. de la Baume PluvinelNouveau tirageParisLibrairie Scientifique et tecnique Albert Blanchard19792 v.ill.22 cmLunettes et telescopes32461Strumenti astronomiciTelescopiLunette522.220Osservatori e strumenti astronomici. TelescopiDanjon,Andrè345996Couder,Andrè632339Baume Pluvinel,A. : de laITUNIPARTHENOPE20081113RICAUNIMARC000019271G 522.2/1G 926DSA2008G 522.2/2G 249DSA2008Lunettes et telescopes32461UNIPARTHENOPE02996nam 2200529 450 991082133160332120220819004647.00-8218-8164-70-8218-4649-3(CKB)3240000000070010(EBL)3113324(SSID)ssj0000629297(PQKBManifestationID)11393257(PQKBTitleCode)TC0000629297(PQKBWorkID)10719224(PQKB)10290852(MiAaPQ)EBC3113324(RPAM)15514853(PPN)197108121(EXLCZ)99324000000007001020081107h20092009 uy| 0engur|n|---|||||txtccrErgodic theory Probability and Ergodic Theory Workshops, February 15-18, 2007, February 14-17, 2008, University of North Carolina, Chapel Hill /Idris Assani, editorProvidence, Rhode Island :American Mathematical Society,[2009]©20091 online resource (171 p.)Contemporary mathematics,4850271-4132Description based upon print version of record.Includes bibliographical references.Contents -- Preface -- Injectivity of the Dubins-Freedman construction of random distributions -- A maximal inequality for the tail of the bilinear Hardy-Littlewood function -- Almost sure convergence of weighted sums of independent random variables -- Recurrence, ergodicity and invariant measures for cocycles over a rotation -- 1. Invariant measures, regularity of a cocycle -- 2. Growth of the ergodic sums over a rotation, application to recurrence -- 3. Examples of ergodic BV Rd-cocycles -- 4. Examples of non-regular cocycles -- 5. Appendix : A Diophantine property for (α, β) -- References -- Examples of recurrent or transient stationary walks in Rd over a rotation of T2 -- 1. A sufficient condition of recurrence for stationary walks -- 2. Series with small denominators -- 3. Growth in norm ll ll2 of the ergodic sums and recurrence -- 4. An example of transient cocycle -- References -- A short proof of the unique ergodicity of horicyclic flows -- A-periodic order via dynamical systems: Diffraction for sets of finite local complexity -- Laws of iterated logarithm for weighted sums of iid random variables -- Homeomorphic Bernoulli trial measures and ergodic theory -- Distinguishing transformations by averaging methods -- Some open problems.Contemporary mathematics,4850271-4132Ergodic theoryCongressesErgodic theory515/.48Assani IdrisChapel Hill Ergodic Theory Workshop(2008 :University of North Carolina, Chapel Hill),MiAaPQMiAaPQMiAaPQBOOK9910821331603321Ergodic theory80545UNINA