02084cam  2200397 i 450000100090000000300050000900500170001400600190003100700150005000800410006502000270010604000340013305000210016708200160018810000310020424501060023526400700034130000380041133600260044933700280047533800270050349000740053050400510060450504660065550600500112153300950117153800360126658800470130265000200134965000240136965000200139365000290141377601520144285600440159485600480163819399926RPAM20170613150157.0m      b    001 0 cr/|||||||||||170613s2016    riu     ob    001 0 eng    a9781470436377 (online)  aDLCbengcDLCerdadDLCdRPAM00aQA313b.N48 201600a515/.482231 aNguyćen, Vićet-Anh,d1974-10aOseledec multiplicative ergodic theorem for laminations /h[electronic resource] cVićet-Anh Nguyćen. 1aProvidence, Rhode Island :bAmerican Mathematical Society,c2016.  a1 online resource (ix, 173 pages)  atextbtxt2rdacontent  aunmediatedbn2rdamedia  avolumebnc2rdacarrier0 aMemoirs of the American Mathematical Society, x1947-6221 ; vv. 1164  aIncludes bibliographical references and index.00tAcknowledgementtChapter 1. IntroductiontChapter 2. BackgroundtChapter 3. Statement of the main resultstChapter 4. Preparatory resultstChapter 5. Leafwise Lyapunov exponentstChapter 6. Splitting subbundlestChapter 7. Lyapunov forward filtrationstChapter 8. Lyapunov backward filtrationstChapter 9. Proof of the main resultstAppendix A. Measure theory for sample-path spacestAppendix B. Harmonic measure theory and ergodic theory for sample-path spaces1 aAccess is restricted to licensed institutions  aElectronic reproduction.bProvidence, Rhode Island :cAmerican Mathematical Society.d2017  aMode of access : World Wide Web  aDescription based on print version record. 0aErgodic theory. 0aTopological spaces. 0aMeasure theory. 0aFoliations (Mathematics)0 iPrint version: aNguyćen, Vićet-Anh, 1974-tOseledec multiplicative ergodic theorem for laminations /w(DLC)   2016055233x0065-9266z97814704225304 3Contentsuhttp://www.ams.org/memo/1164/4 3Contentsuhttps://doi.org/10.1090/memo/1164