02024cam  22004098i 450000100090000000300050000900500170001400600190003100700150005000800410006502000270010604000290013305000230016208200150018510000230020024501190022326300090034226400700035130000340042133600210045533700250047633800230050149000740052450400510059850504140064950600500106353300950111353800360120858800470124465000270129165000220131870000230134070000190136377601400138285600440152285600480156618944023RPAM20170613145842.0m      b    001 0 cr/|||||||||||170613s2016    riu     ob    001 0 eng    a9781470428792 (online)  aDLCbengerdacDLCdRPAM00aQA353.A9bH83 201600a515/.92231 aHuang, Wen,d1975-10aNil Bohr-sets and almost automorphy of higher order /h[electronic resource] cWen Huang, Song Shao, Xiangdong Ye.  a1605 1aProvidence, Rhode Island :bAmerican Mathematical Society,c2016.  a1 online resource (pages cm.)  atext2rdacontent  aunmediated2rdamedia  avolume2rdacarrier0 aMemoirs of the American Mathematical Society, x1947-6221 ; vv. 1143  aIncludes bibliographical references and index.00tChapter 1. IntroductiontChapter 2. PreliminariestChapter 3. NilsystemstChapter 4. Generalized polynomialstChapter 5. Nil Bohr$_0$-sets and generalized polynomials: c Proof of Theorem BtChapter 6. Generalized polynomials and recurrence sets: Proof of Theorem CtChapter 7. Recurrence sets and regionally proximal relation of order $d$tChapter 8. $d$-step almost automorpy and recurrence setstAppendix A.1 aAccess is restricted to licensed institutions  aElectronic reproduction.bProvidence, Rhode Island :cAmerican Mathematical Society.d2016  aMode of access : World Wide Web  aDescription based on print version record. 0aAutomorphic functions. 0aFourier analysis.1 aShao, Song,d1976-1 aYe, Xiangdong.0 iPrint version: aHuang, Wen, 1975-tNil Bohr-sets and almost automorphy of higher order /w(DLC)   2015050793x0065-9266z97814704187244 3Contentsuhttp://www.ams.org/memo/1143/4 3Contentsuhttps://doi.org/10.1090/memo/1143