02081cam  22004218i 450000100090000000300050000900500170001400600190003100700150005000800410006502000270010604000290013305000240016208200170018610000290020324501370023226300090036926400610037830000340043933600260047333700280049933800270052749000740055450400410062850503410066950600500101053300950106053800360115558800470119165000310123865000350126965000390130465000260134370000370136977601610140685600440156785600480161120652527RPAM20180911180403.0m      b    000 0 cr/|||||||||||180911s2018    riu     ob    000 0 eng    a9781470448219 (online)  aDLCbengerdacDLCdRPAM00aQA274.75b.D85 201800a519.2/332231 aDuits, Maurice,eauthor.10aOn mesoscopic equilibrium for linear statistics in Dyson's Brownian motion /h[electronic resource] cMaurice Duits, Kurt Johansson.  a1809 1aProvidence, RI :bAmerican Mathematical Society,c[2018]  a1 online resource (pages cm.)  atextbtxt2rdacontent  aunmediatedbn2rdamedia  avolumebnc2rdacarrier0 aMemoirs of the American Mathematical Society, x1947-6221 ; vv. 1222  aIncludes bibliographical references.00tChapter 1. IntroductiontChapter 2. Statement of resultstChapter 3. Proof of Theorem 2.1tChapter 4. Proof of Theorem 2.3tChapter 5. Asymptotic analysis of $K_n$ and $R_n$tChapter 6. Proof of Proposition 2.4tChapter 7. Proof of Lemma 4.3tChapter 8. Random initial pointstChapter 9. Proof of Theorem 2.6: the general casetAppendix1 aAccess is restricted to licensed institutions  aElectronic reproduction.bProvidence, Rhode Island :cAmerican Mathematical Society.d2018  aMode of access : World Wide Web  aDescription based on print version record. 0aBrownian motion processes. 0aMesoscopic phenomena (Physics) 0aStochastic differential equations. 0aStochastic processes.1 aJohansson, Kurt,d1960-eauthor.0 iPrint version: aDuits, Maurice,tOn mesoscopic equilibrium for linear statistics in Dyson's Brownian motion /w(DLC)   2018040867x0065-9266z97814704296454 3Contentsuhttp://www.ams.org/memo/1222/4 3Contentsuhttps://doi.org/10.1090/memo/1222