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LDR		02041nam u200397 4500
001		000000422208
005		20190215165936
008		181129s2018 |||||||||||||||||c||eng d
020		▼a 9780438290754
035		▼a (MiAaPQ)AAI10825076
035		▼a (MiAaPQ)ucdavis:17914
040		▼a MiAaPQ ▼c MiAaPQ ▼d 247004
082	0	▼a 510
100	1	▼a Xu, Yuanyuan.
245	10	▼a On Several Problems in Random Matrix Theory and Statistical Mechanics.
260		▼a [S.l.]: ▼b University of California, Davis., ▼c 2018.
260	1	▼a Ann Arbor: ▼b ProQuest Dissertations & Theses, ▼c 2018.
300		▼a 78 p.
500		▼a Source: Dissertation Abstracts International, Volume: 80-01(E), Section: B.
500		▼a Adviser: Alexander Soshnikov.
502	1	▼a Thesis (Ph.D.)--University of California, Davis, 2018.
520		▼a Random Matrix Theory(RMT) is a fast developing area of modern Mathematics with deep connections to Probability, Statistical Mechanics, Quantum Theory, Number Theory, Statistics, and Integrable Systems.
520		▼a In the first part of my dissertation, I consider an interacting particle system on the unit circle with stronger repulsion than that of the Circular beta Ensemble in RMT and prove the Gaussian approximation of the distribution of the particles.
520		▼a In the second part of the dissertation, I consider the orthogonal group SO(2n) with the Haar measure and prove the CLT for the linear eigenvalue statistics in the mesoscopic regime where the test function depends on n. The results can be general
590		▼a School code: 0029.
650	4	▼a Mathematics.
690		▼a 0405
710	20	▼a University of California, Davis. ▼b Mathematics.
773	0	▼t Dissertation Abstracts International ▼g 80-01B(E).
773		▼t Dissertation Abstract International
790		▼a 0029
791		▼a Ph.D.
792		▼a 2018
793		▼a English
856	40	▼u http://www.riss.kr/pdu/ddodLink.do?id=T14998730 ▼n KERIS ▼z 이 자료의 원문은 한국교육학술정보원에서 제공합니다.
980		▼a 201812 ▼f 2019
990		▼a ***1012033