Rank of partition and mock theta conjecture
http://bomber0.myid.net/ (토론)님의 2010년 3월 3일 (수) 18:35 판
order 3 Ramanujan mock theta function
- \(f(q) = \sum_{n\ge 0} {q^{n^2}\over (-q;q)_n^2} =1+\sum_{n\ge 1} {q^{n^2}\over (-q;q)_n^2}={2\over \prod_{n>0}(1-q^n)}\sum_{n\in Z}{(-1)^nq^{3n^2/2+n/2}\over 1+q^n}\)
http://www.research.att.com/~njas/sequences/A000025
http://www.research.att.com/~njas/sequences/b000025.txt
Andrews-Dragonette
- [Dragonette1952] and [Andrews1966]
- rank of partition
분할의 rank = 분할에서 가장 큰 수 - 분할의 크기
9의 분할인 {7,1,1}의 경우, rank=7-3=4
9의 분할인 {4,3,1,1}의 경우, rank=4-4=0 - \(N_e(n), N_o(n)\) number of partition with even rank and odd rank
- \(p(n)=N_e(n)+N_o(n)\)
- \(\alpha(n)=N_e(n)-N_o(n)\)
- this is in fact the coefficient of mock theta function
\(f(q) = \sum_{n\ge 0} \alpha(n)q^n\) - thus we need modularity of f(q) to get exact formula for \(\alpha(n)\) as \(p(n)\) obtained by the circle method
harmonic Maass form of weight 1/2
- Zweger's completion
construction of the Maass-Poincare series
generalization
history
books
- 찾아볼 수학책
- http://gigapedia.info/1/mock+theta
- http://gigapedia.info/1/
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- http://gigapedia.info/1/
- http://www.amazon.com/s/ref=nb_ss_gw?url=search-alias%3Dstripbooks&field-keywords=
encyclopedia
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- Princeton companion to mathematics(Companion_to_Mathematics.pdf)
question and answers(Math Overflow)
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blogs
articles[1]
- The f(q) mock theta function conjecture and partition ranks
- Inventiones Mathematicae, 2006
- Partitions : at the interface of q-series and modular forms
- Andrews, George E., 2003
- Andrews, George E., 2003
- [Dragonette1952]Some asymptotic formulae for the mock theta series of Ramanujan
- Dragonette, Leila A. (1952), Transactions of the American Mathematical Society 72: 474–500
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[Andrews1966]On the theorems of Watson and Dragonette for Ramanujan's mock theta functions
- Andrews, George E. (1966), American Journal of Mathematics 88: 454–490
- 논문정리
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- http://front.math.ucdavis.edu/search?a=&t=&c=&n=40&s=Listings&q=
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- http://dx.doi.org/
experts on the field