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By work of Bringmann, Ono, and Rhoades it is known that the generating function of the $M_2$-rank of partitions without repeated odd parts is the so-called holomorphic part of a certain harmonic Maass form. Here we improve the standing of…

Number Theory · Mathematics 2017-02-10 Chris Jennings-Shaffer

We investigate the modular properties of a new partition rank, the $M_d$-rank of overpartitions. In fact this is an infinite family of ranks, indexed by the positive integer $d$, that gives both the Dyson rank of overpartitions and the…

Number Theory · Mathematics 2017-06-05 Chris Jennings-Shaffer , Holly Swisher

In this paper we give a full description of the inequalities that can occur between overpartition ranks. If $ \overline{N}(a,c,n) $ denotes the number of overpartitions of $ n $ with rank congruent to $ a $ modulo $ c,$ we prove that for…

Number Theory · Mathematics 2020-11-06 Alexandru Ciolan

We show that the Zagier-Eisenstein series shares its non-holomorphic part with certain weak Maass forms whose holomorphic parts are generating functions for overpartition rank differences. This has a number of consequences, including exact…

Number Theory · Mathematics 2007-12-06 Kathrin Bringmann , Jeremy Lovejoy

In a series of papers the first author and Ono connected the rank, a partition statistic introduced by Dyson, to weak Maass forms, a new class of functions which are related to modular forms. Naturally it is of wide interest to find other…

Number Theory · Mathematics 2007-08-07 Kathrin Bringmann , Jeremy Lovejoy

We study two types of crank moments and two types of rank moments for overpartitions. We show that the crank moments and their derivatives, along with certain linear combinations of the rank moments and their derivatives, can be written in…

Number Theory · Mathematics 2021-02-03 Kathrin Bringmann , Jeremy Lovejoy , Robert Osburn

We prove that the generating function of overpartition $M2$-rank differences is, up to coefficient signs, a component of the vector-valued mock Eisenstein series attached to a certain quadratic form. We use this to compute analogs of the…

Number Theory · Mathematics 2018-09-26 Brandon Williams

In 1954, Atkin and Swinnerton-Dyer proved Dyson's conjectures on the rank of a partition by establishing formulas for the generating functions for rank differences in arithmetic progressions. In this paper, we prove formulas for the…

Number Theory · Mathematics 2021-02-03 Jeremy Lovejoy , Robert Osburn

We prove formulas for the generating functions for M_2-rank differences for partitions without repeated odd parts. These formulas are in terms of modular forms and generalized Lambert series.

Number Theory · Mathematics 2021-02-03 Jeremy Lovejoy , Robert Osburn

In a previous work (arXiv:2505.05574), a summation formula for harmonic Maass forms of polynomial growth was established. In this note, we use the theory of $L$-series of harmonic Maass forms to state and prove a summation formula for such…

Number Theory · Mathematics 2025-09-29 Nikolaos Diamantis , Joshua Pimm

We prove general fomulas for the deviations of two overpartition ranks from the average. These formulas are in terms of Appell--Lerch series and sums of quotients of theta functions and can be used, among other things, to recover any of the…

Number Theory · Mathematics 2025-07-14 Jeremy Lovejoy , Robert Osburn

This is the third and final installment in our series of papers applying the method of Atkin and Swinnerton-Dyer to deduce formulas for rank differences. The study of rank differences was initiated by Atkin and Swinnerton-Dyer in their…

Number Theory · Mathematics 2021-02-03 Jeremy Lovejoy , Robert Osburn

In this paper, we obtain inequalities on $M_2$-ranks of overpartitions modulo $6$. Let $\overline{N}_2(s,m,n)$ to be the number of overpartitions of $n$ whose $M_2$-rank is congruent to $s$ modulo $m$. For $M_2$-ranks modulo $3$, Lovejoy…

Combinatorics · Mathematics 2018-05-11 Helen W. J. Zhang

We define the supermodular rank of a function on a lattice. This is the smallest number of terms needed to decompose it into a sum of supermodular functions. The supermodular summands are defined with respect to different partial orders. We…

Combinatorics · Mathematics 2023-05-25 Rishi Sonthalia , Anna Seigal , Guido Montufar

In this paper, we develop several general techniques to investigate modular invariants of conformal field theories whose algebras of the holomorphic and anti-holomorphic sectors are different. As an application, we find all such…

High Energy Physics - Theory · Physics 2009-10-28 T. Gannon , Q. Ho-Kim

The modularity of the partition generating function has many important consequences, for example asymptotics and congruences for $p(n)$. In a series of papers the author and Ono \cite{BO1,BO2} connected the rank, a partition statistic…

Number Theory · Mathematics 2007-12-05 Kathrin Bringmann

This is the second of two coupled papers estimating the mean values of multiplicative functions, of unknown support, on arithmetic progressions with large differences. Applications are made to the study of primes in arithmetic progression…

Number Theory · Mathematics 2014-05-29 P. D. T. A. Elliott , Jonathan Kish

We introduce an L-series associated with harmonic Maass forms and prove their functional equations. We establish converse theorems for these L-series and, as an application, we formulate and prove a summation formula for the holomorphic…

Number Theory · Mathematics 2024-02-20 Nikolaos Diamantis , Min Lee , Wissam Raji , Larry Rolen

We construct a natural basis for the space of weak harmonic Maass forms of weight 5/2 on the full modular group. The non-holomorphic part of the first element of this basis encodes the values of the ordinary partition function p(n). We…

Number Theory · Mathematics 2015-04-15 Scott Ahlgren , Nickolas Andersen

Denote by $p(n)$ the number of partitions of $n$ and by $N(a,M;n)$ the number of partitions of $n$ with rank congruent to $a$ modulo $M$. We find and prove a general formula for Dyson's ranks by considering the deviation of the ranks from…

Number Theory · Mathematics 2017-02-09 Dean Hickerson , Eric Mortenson
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