02498nam 2200625 a 450 991078584310332120211104004419.03-11-084464-810.1515/9783110844641(CKB)2670000000251932(EBL)935126(OCoLC)843204918(SSID)ssj0000665498(PQKBManifestationID)12282656(PQKBTitleCode)TC0000665498(PQKBWorkID)10633882(PQKB)10512751(MiAaPQ)EBC935126(DE-B1597)52987(OCoLC)840440623(OCoLC)990660153(DE-B1597)9783110844641(Au-PeEL)EBL935126(CaPaEBR)ebr10599528(PPN)17550900X(EXLCZ)99267000000025193219850228d1985 uy 0engurnn#---|u||utxtccrErgodic theorems[electronic resource] /Ulrich Krengel ; with a supplement by Antoine BrunelBerlin ;New York Walter de Gruyter19851 online resource (368 p.)De Gruyter Studies in Mathematics ;6Description based upon print version of record.3-11-008478-3 Includes bibliographical references and index.Front matter --Chapter 1: Measure preserving and null preserving point mappings --Chapter 2: Mean ergodic theory --Chapter 3: Positive contractions in L1 --Chapter 4: Extensions of the L1-theory --Chapter 5: Operators in C(K) and in Lp, (1<p<∞) --Chapter 6: Pointwise ergodic theorems for multiparameter and amenable semigroups --Chapter 7: Local ergodic theorems and differentiation --Chapter 8: Subsequences and generalized means --Chapter 9: Special topics --Supplement: Harris Processes, Special Functions, Zero-Two-Law (by Antoine Brunei) --Bibliography --Notation --Index --Back matterErgodic Theorems (De Gruyter Studies in Mathematics).De Gruyter Studies in MathematicsErgodic theoryErgodic theory.515.4/2SK 810rvkKrengel Ulrich1937-48369Brunel Antoine346633MiAaPQMiAaPQMiAaPQBOOK9910785843103321Ergodic theorems3794607UNINA