Dyson's ranks and Maass forms
成果类型:
Article
署名作者:
Bringmann, Kathrin; Ono, Ken
刊物名称:
ANNALS OF MATHEMATICS
ISSN/ISSBN:
0003-486X
DOI:
10.4007/annals.2010.171.419
发表日期:
2010
页码:
419-449
关键词:
mock theta-functions
partition-function
modular-forms
congruences
CURVES
crank
摘要:
Motivated by work of Ramanujan, Freeman Dyson defined the rank of an integer partition to be its largest part minus its number of parts. If N(m, n) denotes the number of partitions of n with rank m, then it turns out that R(w; q) : = 1 + Sigma(infinity)(n=1) Sigma(infinity)(m=-infinity) N(m, n)w(m)q(n) = 1 + Sigma(infinity)(n=1) q(n2)/Pi(n)(j=1)(1-(w+w(-1))q(j) + q(2j)). We show that if zeta not equal 1 is a root of unity, then R(zeta; q) is essentially the holomorphic part of a weight 1/2 weak Maass form on a subgroup of SL2(Z). For integers 0 <= r < t, we use this result to determine the modularity of the generating function for N(r, t; n), the number of partitions of n whose rank is congruent to r (mod t). We extend the modularity above to construct an infinite family of vector valued weight 1/2 forms for the full modular group SL2(Z), a result which is of independent interest.