Your search keyword '"05A17, 11P83"' showing total 98 results

1. Distribution and congruences of $(u,v)$-regular bipartitions

Author

Meher, Nabin Kumar

Subjects

Mathematics - Number Theory, 05A17, 11P83

Abstract

Let $B_{u,v}(n)$ denote the number of $(u,v)$-regular bipartitions of $n$. In this article, we prove that $B_{p,m}(n)$ is always almost divisible by $p,$ where $p\geq 5$ is a prime number and $m=p_1^{\alpha_1} p_2^{\alpha_2}\cdots p_r^{\alpha_r}, $ where $\alpha_i \geq 0$ and $p_i \geq 5$ be distinct primes with $\gcd(p,m)=1$ . Further, we obtain an infinities families of congruences modulo $3$ for $B_{3,7}(n),$ $B_{3,5}(n)$ and $B_{3,2}(n)$ by using Hecke eigenform theory and a result of Newman \cite{Newmann1959}. Furthermore, we get many infinite families of congruences modulo $7$, $11$ and $13$ respectively for $B_{2,7}(n)$, $B_{2,11}(n)$ and $B_{2,13}(n),$ by employing an identity of Newman \cite{Newmann1959}. In addition, we prove infinite families of congruences modulo $2$ for $B_{4,3}(n)$, $B_{8,3}(n)$ and $B_{4,5}(n)$ by applying another result of Newman \cite{Newmann1962}., Comment: First draft of the paper. Comments are welcome. arXiv admin note: substantial text overlap with arXiv:2406.06224, arXiv:2406.07905

Published

2024

2. Arithmetic density and congruences of $\ell$-regular bipartitions $II$

Author

Meher, Nabin Kumar

Subjects

Mathematics - Number Theory, 05A17, 11P83

Abstract

Let $ B_{\ell}(n)$ denote the number of $\ell-$regular bipartitions of $n.$ In 2013, Lin \cite{Lin2013} proved a density result for $B_4(n).$ He showed that for any positive integer $k,$ $B_4(n)$ is almost always divisible by $2^k.$ In this article, we improved his result. We prove that $B_{2^{\alpha}m}(n)$ and $B_{3^{\alpha}m}(n)$ are almost always divisible by arbitrary power of $2$ and $3$ respectively. Further, we obtain an infinities families of congruences and multiplicative formulae for $B_2(n)$ and $B_4(n)$ by using Hecke eigenform theory. Next, by using a result of Ono and Taguchi on nilpotency of Hecke operator, we also find an infinite families of congruences modulo arbitrary power of $2$ satisfied by $B_{2^{\alpha}}(n).$, Comment: Comments are welcome. arXiv admin note: substantial text overlap with arXiv:2406.06224; text overlap with arXiv:2302.11830; text overlap with arXiv:2405.05274 by other authors

Published

2024

3. Arithmetic density and congruences of $\ell$-regular bipartitions

Author

Meher, Nabin Kumar and Jindal, Ankita

Subjects

Mathematics - Number Theory, 05A17, 11P83

Abstract

Let $ B_{\ell}(n)$ denote the number of $\ell$-regular bipartitions of $n.$ In this article, we prove that $ B_{\ell}(n)$ is always almost divisible by $p_i^j$ if $p_i^{2a_i}\geq \ell,$ where $j$ is a fixed positive integer and $\ell=p_1^{a_1}p_2^{a_2}\ldots p_m^{a_m},$ where $p_i$ are prime numbers $\geq 5.$ Further, we obtain an infinities families of congruences for $B_3(n)$ and $B_5(n)$ by using Hecke eigen form theory and a result of Newman \cite{Newmann1959}. Furthermore, by applying Radu and Seller's approach, we obtain an algorithm from which we get several congruences for $B_{p}(n)$, where $p$ is a prime number.

Published

2024

4. New congruences for partitions where the even parts are distinct

Author

Nath, Hemjyoti

Subjects

Mathematics - Number Theory, 05A17, 11P83

Abstract

We denote the number of partitions of $n$ wherein the even parts are distinct (and the odd parts are unrestricted) by $ped(n)$. In this paper, we will use generating function manipulations to obtain new congruences for $ped(n)$ modulo $24$., Comment: 5 pages

Published

2024

5. Biases in Non-Unitary Partitions

Author

Mahanta, Pankaj Jyoti, Saikia, Manjil P., and Sarma, Abhishek

Subjects

Mathematics - Number Theory, Mathematics - Combinatorics, 05A17, 11P83

Abstract

Recently, the concept of parity bias in integer partitions has been studied by several authors. We continue this study here, but for non-unitary partitions (namely, partitions with parts greater than $1$). We prove analogous results for these restricted partitions as those that have been obtained by Kim, Kim, and Lovejoy (2020) and Kim and Kim (2021). We also look at inequalities between two classes of partitions studied by Andrews (2019) where the parts are separated by parity (either all odd parts are smaller than all even parts or vice versa)., Comment: 11 pages

Published

2023

6. Congruences for modular forms and applications to crank functions

Author

Zhang, Hao and Zhang, Helen W. J.

Subjects

Mathematics - Number Theory, 05A17, 11P83

Abstract

In this paper, motivated by the work of Mahlburg, we find congruences for a large class of modular forms. Moreover, we generalize the generating function of the Andrews-Garvan-Dyson crank on partition and establish several new infinite families of congruences. In this framework, we showed that both the birank of an ordered pair of partitions introduced by Hammond and Lewis, and $k$-crank of $k$-colored partition introduced by Fu and Tang process the same as the partition function and crank.

Published

2022

7. Witness identities for three Ramanujan congruences

Author

Baruah, Nayandeep Deka, Das, Hirakjyoti, and Sarma, Abhishek

Subjects

Mathematics - Number Theory, 05A17, 11P83

Abstract

For the unrestricted partition function $p(n)$ for integers $n \geq 0$, it is known that $p(49n + 19) \equiv 0 \pmod{49}$, $p(49n + 33) \equiv 0 \pmod{49}$, and $p(49n + 40) \equiv 0 \pmod{49}$ for all $n \geq 0$. We find witness identities for these Ramanujan congruences.

Published

2022

8. Combinatorial meaning of the number of the even parts in a partition of $n$ into distinct parts

Author

Li, Jiyou and Zhao, Sicheng

Subjects

Mathematics - Combinatorics, 05A17, 11P83

Abstract

In a recent paper, Andrews and Merca investigated the number of even parts in all partitions of $n$ into distinct parts, which arise naturally from the Euler-Glaisher bijective proof. They obtained new combinatorial interpretations for this number by using generating functions. We obtain a new direct combinatorial proof in this note., Comment: 5 pages

Published

2022

9. Combinatorial proofs of the Ramanujan type congruences modulo 3

Author

Hao, Robert X. J.

Subjects

Mathematics - Combinatorics, 05A17, 11P83

Abstract

The partition statistic $V_R$-rank is introduced to give combinatorial proofs of the Ramanujan type congruences mod 3 for certain classes of partition functions., Comment: 14 pages

Published

2021

10. A crank-based approach to the theory of 3-core partitions

Author

Brunat, Olivier and Nath, Rishi

Subjects

Mathematics - Number Theory, Mathematics - Combinatorics, 05A17, 11P83

Abstract

This note is concerned with the set of integral solutions of the equation $x^2+3y^2=12n+4$, where $n$ is a positive integer. We will describe a parametrization of this set using the 3-core partitions of n. In particular we construct a crank using the action of a suitable subgroup of the isometric group of the plane that we connect with the unit group of the ring of Eisenstein integers. We also show that the process goes in the reverse direction: from the solutions of the equation and the crank, we can describe the 3-core partitions of n. As a consequence we describe an explicit bijection between $3$-core partitions and ideals of the ring of Eisenstein integers, explaining a result of G. Han and K. Ono obtained using modular forms., Comment: accepted to Proc. of the AMS

Published

2021

11. Restricted k-color partitions, II

Author

Keith, William J.

Subjects

Mathematics - Combinatorics, 05A17, 11P83

Abstract

We consider $(k,j)$-colored partitions, partitions in which $k$ colors exist but at most $j$ colors may be chosen per size of part. In particular these generalize overpartitions. Advancing previous work, we find new congruences, including in previously unexplored cases where $k$ and $j$ are not coprime, as well as some noncongruences. As a useful aside, we give the apparently new generating function for the number of partitions in the $N \times M$ box with a given number of part sizes, and extend to multiple colors a conjecture of Dousse and Kim on unimodality in overpartitions., Comment: 9 pages. Submitted to Proceedings of Berndt 80

Published

2020

12. Simultaneous core partitions with nontrivial common divisor

Author

Gramain, Jean-Baptiste, Nath, Rishi, and Sellers, James A.

Subjects

Mathematics - Combinatorics, Mathematics - Number Theory, 05A17, 11P83

Abstract

A tremendous amount of research has been done in the last two decades on $(s,t)$-core partitions when $s$ and $t$ are positive integers with no common divisor. Here we change perspective slightly and explore properties of $(s,t)$-core and $(\bar{s},\bar{t})$-core partitions for $s$ and $t$ with nontrivial common divisor $g$. We begin by revisiting work by D. Aukerman, D. Kane and L. Sze on $(s,t)$-core partitions for nontrivial $g$ before obtaining a generating function for the number of $(\bar{s},\bar{t})$-core partitions of $n$ under the same conditions. Our approach, using the $g$-core, $g$-quotient and bar-analogues, allows for new results on $t$-cores and self-conjugate $t$-cores that are {\it not} $g$-cores and $\bar{t}$-cores that are {\it not} $\bar{g}$-cores, thus strengthening positivity results of K. Ono and A. Granville, J. Baldwin et. al., and I. Kiming. We then detail a new bijection between self-conjugate $(s,t)$-core and $(\bar{s},\bar{t})$-core partitions for $s$ and $t$ odd with odd, nontrivial common divisor $g$. Here the core-quotient construction fits remarkably well with certain lattice-path labelings due to B. Ford, H. Mai, and L. Sze and C. Bessenrodt and J. Olsson. Along the way we give a new proof of a correspondence of J. Yang between self-conjugate $t$-core and $\bar{t}$-core partitions when $t$ is odd and positive. We end by noting $(s,t)$-core and $(\bar{s}, \bar{t})$-core partitions inherit Ramanujan-type congruences from those of $g$-core and $\bar{g}$-core partitions., Comment: 22 pages. To appear in Ramanujan Journal

Published

2019

13. On a new parameter involving Ramanujan's theta-functions

Author

Chandankumar, S. and Bharadwaj, H. S. Sumanth

Subjects

Mathematics - Number Theory, 05A17, 11P83

Abstract

We define a new parameter $A'_{k,n}$ involving Ramanujan's theta-functions for any positive real numbers $k$ and $n$ which is analogous to the parameter $A_{k,n}$ defined by Nipen Saikia \cite{NS1}. We establish some modular relation involving $A'_{k,n}$ and $A_{k,n}$ to find some explicit values of $A'_{k,n}$. We use these parameters to establish few general theorems for explicit evaluations of ratios of theta functions involving $\varphi(q)$.

Published

2019

14. On 3 and 9-regular cubic partitions

Author

Gireesh, D. S., Naika, M. S. Mahadeva, and C, Shivashankar

Subjects

Mathematics - Number Theory, 05A17, 11P83

Abstract

Let $a_3(n)$ and $a_9(n)$ are 3 and 9-regular cubic partitions of $n$. In this paper, we find the infinite family of congruences modulo powers of 3 for $a_3(n)$ and $a_9(n)$ such as \[a_3\left (3^{2\alpha}n+\frac{3^{2\alpha}-1}{4}\right )\equiv 0 \pmod{3^{\alpha}}\] and \[a_9\left (3^{\alpha+1}n+3^{\alpha+1}-1\right )\equiv 0 \pmod{3^{\alpha+1}}.\]

Published

2019

15. A lecture hall theorem for $m$-falling partitions

Author

Fu, Shishuo, Tang, Dazhao, and Yee, Ae Ja

Subjects

Mathematics - Combinatorics, 05A17, 11P83

Abstract

For an integer $m\ge 2$, a partition $\lambda=(\lambda_1,\lambda_2,\ldots)$ is called $m$-falling, a notion introduced by Keith, if the least nonnegative residues mod $m$ of $\lambda_i$'s form a nonincreasing sequence. We extend a bijection originally due to the third author to deduce a lecture hall theorem for such $m$-falling partitions. A special case of this result gives rise to a finite version of Pak-Postnikov's $(m,c)$-generalization of Euler's theorem. Our work is partially motivated by a recent extension of Euler's theorem for all moduli, due to Keith and Xiong. We note that their result actually can be refined with one more parameter., Comment: 14 pages, 3 figures, 1 tables

Published

2019

16. Arithmetic properties of cubic and overcubic partition pairs

Author

Ray, Chiranjit and Barman, Rupam

Subjects

Mathematics - Number Theory, 05A17, 11P83

Abstract

Let $b(n)$ denote the number of cubic partition pairs of $n$. We give affirmative answer to a conjecture of Lin, namely, we prove that $$b(49n+37)\equiv 0 \pmod{49}.$$ We also prove two congruences modulo $256$ satisfied by $\overline{b}(n)$, the number of overcubic partition pairs of $n$. Let $\overline{a}(n)$ denote the number of overcubic partition of $n$. For a fixed positive integer $k$, we further show that $\overline{b}(n)$ and $\overline{a}(n)$ are divisible by $2^k$ for almost all $n$. We use arithmetic properties of modular forms to prove our results.

Published

2018

17. Elementary proof of congruences modulo 25 for broken $k$-diamond partitions

Author

Chern, Shane and Tang, Dazhao

Subjects

Mathematics - Combinatorics, 05A17, 11P83

Abstract

Let $\Delta_{k}(n)$ denote the number of $k$-broken diamond partitions of $n$. Quite recently, the second author proved an infinite family of congruences modulo 25 for $\Delta_{k}(n)$ with the help of modular forms. In this paper, we aim to provide an elementary proof of this result., Comment: 9 pages

Published

2018

18. Congruences modulo powers of 3 for 2-color partition triples

Author

Tang, Dazhao

Subjects

Mathematics - Combinatorics, 05A17, 11P83

Abstract

Let $p_{k,3}(n)$ enumerate the number of 2-color partition triples of $n$ where one of the colors appears only in parts that are multiples of $k$. In this paper, we prove several infinite families of congruences modulo powers of 3 for $p_{k,3}(n)$ with $k=1, 3$, and $9$. For example, for all integers $n\geq0$ and $\alpha\geq1$, we prove that \begin{align*} p_{3,3}\left(3^{\alpha}n+\dfrac{3^{\alpha}+1}{2}\right) &\equiv0\pmod{3^{\alpha+1}} \end{align*} and \begin{align*} p_{3,3}\left(3^{\alpha+1}n+\dfrac{5\times3^{\alpha}+1}{2}\right) &\equiv0\pmod{3^{\alpha+4}}. \end{align*}, Comment: 14 pages, to appear in Period. Math. Hungar

Published

2018

19. On certain unimodal sequences and strict partitions

Author

Fu, Shishuo and Tang, Dazhao

Subjects

Mathematics - Combinatorics, 05A17, 11P83

Abstract

Building on a bijection of Vandervelde, we enumerate certain unimodal sequences whose alternating sum equals zero. This enables us to refine the enumeration of strict partitions with respect to the number of parts and the BG-rank., Comment: 11 pages, 2 figures, 1 table

Published

2018

20. Congruences Modulo Powers of 3 for 3- and 9-Colored Generalized Frobenius Partitions

Author

Wang, Liuquan

Subjects

Mathematics - Combinatorics, Mathematics - Number Theory, 05A17, 11P83

Abstract

Let $c\phi_{k}(n)$ be the number of $k$-colored generalized Frobenius partitions of $n$. We establish some infinite families of congruences for $c\phi_{3}(n)$ and $c\phi_{9}(n)$ modulo arbitrary powers of 3, which refine the results of Kolitsch. For example, for $k\ge 3$ and $n\ge 0$, we prove that \[c\phi_{3}\Big(3^{2k}n+\frac{7\cdot 3^{2k}+1}{8}\Big) \equiv 0 \pmod{3^{4k+5}}.\] We give two different proofs to the congruences satisfied by $c\phi_{9}(n)$. One of the proofs uses an relation between $c\phi_{9}(n)$ and $c\phi_{3}(n)$ due to Kolitsch, for which we provide a new proof in this paper., Comment: 18 pages

Published

2018

21. Fractional Powers of the Generating Function for the Partition Function

Author

Chan, Heng Huat and Wang, Liuquan

Subjects

Mathematics - Number Theory, Mathematics - Combinatorics, 05A17, 11P83

Abstract

Let $p_{k}(n)$ be the coefficient of $q^n$ in the series expansion of $(q;q)_{\infty}^{k}$. It is known that the partition function $p(n)$, which corresponds to the case when $k=-1$, satisfies congruences such as $p(5n+4)\equiv 0\pmod{5}$. In this article, we discuss congruences satisfied by $p_{k}(n)$ when $k$ is a rational number.

Published

2018

22. Congruences modulo powers of 5 for $k$-colored partitions

Author

Tang, Dazhao

Subjects

Mathematics - Combinatorics, 05A17, 11P83

Abstract

Let $p_{-k}(n)$ enumerate the number of $k$-colored partitions of $n$. In this paper, we establish some infinite families of congruences modulo 25 for $k$-colored partitions. Furthermore, we prove some infinite families of Ramanujan-type congruences modulo powers of 5 for $p_{-k}(n)$ with $k=2, 6$, and $7$. For example, for all integers $n\geq0$ and $\alpha\geq1$, we prove that \begin{align*} p_{-2}\left(5^{2\alpha-1}n+\dfrac{7\times5^{2\alpha-1}+1}{12}\right) &\equiv0\pmod{5^{\alpha}} \end{align*} and \begin{align*} p_{-2}\left(5^{2\alpha}n+\dfrac{11\times5^{2\alpha}+1}{12}\right) &\equiv0\pmod{5^{\alpha+1}}. \end{align*}, Comment: 15 pages, submitted to J. Number Theory

Published

2017

23. Bisected theta series, least $r$-gaps in partitions, and polygonal numbers

Author

Ballantine, Cristina and Merca, Mircea

Subjects

Mathematics - Combinatorics, Mathematics - Number Theory, 05A17, 11P83

Abstract

The least $r$-gap, $g_r(\lambda)$, of a partition $\lambda$ is the smallest part of $\lambda$ appearing less than $r$ times. In this article we introduce two new partition functions involving least $r$-gaps. We consider a bisection of a classical theta identity and prove new identities relating Euler's partition function $p(n)$, polygonal numbers, and the new partition functions. To prove the results we use an interplay of combinatorial and $q$-series methods. We also give a combinatorial interpretation for $$\sum_{n=0}^\infty (\pm 1)^{k(k+1)/2} p(n-r\cdot k(k+1)/2).$$, Comment: 10 pages

Published

2017

24. Some inequalities for $k$-colored partition functions

Author

Chern, Shane, Fu, Shishuo, and Tang, Dazhao

Subjects

Mathematics - Combinatorics, 05A17, 11P83

Abstract

Motivated by a partition inequality of Bessenrodt and Ono, we obtain analogous inequalities for $k$-colored partition functions $p_{-k}(n)$ for all $k\geq2$. This enables us to extend the $k$-colored partition function multiplicatively to a function on $k$-colored partitions, and characterize when it has a unique maximum. We conclude with one conjectural inequality that strengthens our results., Comment: 11 pages, 1 table

Published

2017

25. New congruences for broken $k$-diamond partitions

Author

Tang, Dazhao

Subjects

Mathematics - Combinatorics, 05A17, 11P83

Abstract

The notion of broken $k$-diamond partitions was introduced by Andrews and Paule. Let $\Delta_{k}(n)$ denote the number of broken $k$-diamond partitions of $n$ for a fixed positive integer $k$. In this paper, we establish new infinite families of broken $k$-diamond partition congruences., Comment: 8 pages

Published

2017

26. On the Enumeration and Congruences for m-ary Partitions

Author

Sun, Lisa Hui and Zhang, Mingzhi

Subjects

Mathematics - Combinatorics, 05A17, 11P83

Abstract

Let $m\ge 2$ be a fixed positive integer. Suppose that $m^j \leq n< m^{j+1}$ is a positive integer for some $j\ge 0$. Denote $b_{m}(n)$ the number of $m$-ary partitions of $n$, where each part of the partition is a power of $m$. In this paper, we show that $b_m(n)$ can be represented as a $j$-fold summation by constructing a one-to-one correspondence between the $m$-ary partitions and a special class of integer sequences rely only on the base $m$ representation of $n$. It directly reduces to Andrews, Fraenkel and Sellers' characterization of the values $b_{m}(mn)$ modulo $m$. Moreover, denote $c_{m}(n)$ the number of $m$-ary partitions of $n$ without gaps, wherein if $m^i$ is the largest part, then $m^k$ for each $0\leq k

Published

2017

27. Generalizing a partition theorem of Andrews

Author

Fu, Shishuo and Tang, Dazhao

Subjects

Mathematics - Combinatorics, 05A17, 11P83

Abstract

Motivated by Andrews' recent work related to Euler's partition theorem, we consider the set of partitions of an integer $n$ where the set of even parts has exactly $j$ elements, versus the set of partitions of $n$ where the set of repeated parts has exactly $j$ elements. These two sets of partitions turn out to be equinumerous, and this naturally encloses Euler's theorem and Andrews' theorem as two special cases. We give two proofs, one using generating function, and the other is a direct bijection that builds on Glaisher's bijection, Comment: 7 pages, 2 Tables; Submitted to Math. Student

Published

2017

28. Multiranks and classical theta functions

Author

Fu, Shishuo and Tang, Dazhao

Subjects

Mathematics - Combinatorics, 05A17, 11P83

Abstract

Multiranks and new rank/crank analogs for a variety of partitions are given, so as to imply combinatorially some arithmetic properties enjoyed by these types of partitions. Our methods are elementary relying entirely on the three classical theta functions, and are motivated by the seminal work of Ramanujan, Garvan, Hammond and Lewis., Comment: 17 pages, 3 figures

Published

2016

29. Some Congruences of a Restricted Bipartition Function

Author

Saikia, Nipen and Boruah, Chayanika

Subjects

Mathematics - Number Theory, 05A17, 11P83

Abstract

Let $c_N(n)$ denotes the number of bipartitions $(\lambda, \mu)$ of a positive integer $n$ subject to the restriction that each part of $\mu$ is divisible by $N$. In this paper, we prove some congruence properties of the function $c_N(n)$ for $N=7$, 11, and $5l$, for any integer $l\ge 1$, by employing Ramanujan's theta-function identities.

Published

2016

30. The distribution of the number of parts of $m$-ary partitions modulo $m$

Author

Edgar, Tom

Subjects

Mathematics - Combinatorics, 05A17, 11P83

Abstract

We investigate the number of parts modulo $m$ of $m$-ary partitions of a positive integer $n$. We prove that the number of parts is equidistributed modulo $m$ on a special subset of $m$-ary partitions. As consequences, we explain when the number of parts is equidistributed modulo $m$ on the entire set of partitions, and we provide an alternate proof of a recent result of Andrews, Fraenkel, and Sellers about the number of $m$-ary partitions modulo $m$., Comment: 10 pages, 1 figure, To appear in Rocky Mountain Journal of Mathematics

Published

2016

31. Congruences on the Number of Restricted $m$-ary Partitions

Author

Hou, Qing-Hu, Jin, Hai-Tao, Mu, Yan-Ping, and Zhang, Li

Subjects

Mathematics - Combinatorics, Mathematics - Number Theory, 05A17, 11P83

Abstract

Andrews, Brietzke, R\o dseth and Sellers proved an infinite family of congruences on the number of the restricted $m$-ary partitions when $m$ is a prime. In this note, we show that these congruences hold for arbitrary positive integer $m$ and thus confirm the conjecture of Andrews, et al., Comment: 6 pages

Published

2015

32. Ramanujan-type Congruences for $\ell$-Regular Partitions Modulo $3, 5, 11$ and $13$

Author

Jin, Hai-Tao and Zhang, Li

Subjects

Mathematics - Combinatorics, Mathematics - Number Theory, 05A17, 11P83

Abstract

Let $b_\ell(n)$ be the number of $\ell$-regular partitions of $n$. Recently, Hou et al established several infinite families of congruences for $b_\ell(n)$ modulo $m$, where $(\ell,m)=(3,3),(6,3),(5,5),(10,5)$ and $(7,7)$. In this paper, by the vanishing property given by Hou et al, we show an infinite family of congruence for $b_{11}(n)$ modulo $11$. Moreover, for $\ell= 3, 13$ and $25$, we obtain three infinite families of congruences for $b_{\ell}(n)$ modulo $3, 5$ and $13$ by the theory of Hecke eigenforms., Comment: 13 pages

Published

2015

33. Proof of a Conjecture on 6-colored Generalized Frobenius Partitions

Author

Wang, Liuquan

Subjects

Mathematics - Number Theory, Mathematics - Combinatorics, 05A17, 11P83

Abstract

Let $c\phi_{k}(n)$ be the $k$-colored generalized Frobenius partition function. By employing the generating function of $c\phi_{6}(3n+1)$ found by Hirschhorn, we prove that $c\phi_{6}(27n+16)\equiv 0$ (mod 243). This confirms a conjecture of E.X.W. Xia. We also find a congruence relation $c\phi_{6}(81n+61) \equiv 3 c\phi_{6}(9n+7)$ (mod 243). Moreover, we show that $c\phi_{6}(81n+61) \equiv 0$ (mod 81), $c\phi_{6}(243n+142) \equiv 0$ (mod 243) and $c\phi_{6}(729n+ 547) \equiv 0$ (mod 243). We further conjecture that for $n\ge 0$, $c\phi_{6}(243n+142) \equiv 0$ (mod 729)., Comment: 7 pages

Published

2015

34. Partitions into a small number of part sizes

Author

Keith, William J.

Subjects

Mathematics - Combinatorics, 05A17, 11P83

Abstract

We study $\nu_k(n)$, the number of partitions of $n$ into $k$ part sizes, and find numerous arithmetic progressions where $\nu_2$ and $\nu_3$ take on values divisible by 2 and 4. Expanding earlier work, we show $\nu_2(An+B) \equiv 0 \pmod{4}$ for (A,B) = (36,30), (72,42), (252,114), (196,70), and likely many other progressions for which our method should easily generalize. Of some independent interest, we prove that the overpartition function $\bar{p}(n) \equiv 0 \pmod{16}$ in the first three progressions (the fourth is known), and thereby show that $\nu_3(An+B) \equiv 0 \pmod{2}$ in each of these progressions as well, and discuss the relationship between these congruences in more generality. We end with open questions in this area., Comment: 11 pages; v2, small correction to proof of Theorem 7; v3, clean up some explanations, acknowledge recent results from Xinhua Xiong on overpartitions mod 16; v4, final journal version to appear International Journal of Number Theory (Feb. 2017)

Published

2015

35. Arithmetic Properties of Overpartition Triples

Author

Wang, Liuquan

Subjects

Mathematics - Number Theory, Mathematics - Combinatorics, 05A17, 11P83

Abstract

Let ${{\overline{p}}_{3}}(n)$ be the number of overpartition triples of $n$. By elementary series manipulations, we establish some congruences for ${\overline{p}}_{3}(n)$ modulo small powers of 2, such as \[{{\overline{p}}_{3}}(16n+14)\equiv 0 \pmod{32}, \quad {{\overline{p}}_{3}}(8n+7)\equiv 0 \pmod{64}.\] We also find many arithmetic properties for ${{\overline{p}}_{3}}(n)$ modulo 7, 9 and 11, involving the following infinite families of Ramanujan-type congruences: for any integers $\alpha \ge 1$ and $n \ge 0$, we have ${{\overline{p}}_{3}}\big({{3}^{2\alpha +1}}(3n+2)\big)\equiv 0$ (mod $9\cdot 2^4$), $\overline{p}_{3}(4^{\alpha-1}(56n+49)) \equiv 0$ (mod 7) and \[{{\overline{p}}_{3}}\big({{7}^{2\alpha +1}}(7n+3)\big)\equiv {{\overline{p}}_{3}}\big({{7}^{2\alpha +1}}(7n+5)\big)\equiv {{\overline{p}}_{3}}\big({{7}^{2\alpha +1}}(7n+6)\big)\equiv 0 \pmod{7}.\], Comment: 14 pages. We corrected some typos in the first version. Some new results have been added

Published

2014

36. Restricted k-color partitions

Author

Keith, William J.

Subjects

Mathematics - Combinatorics, 05A17, 11P83

Abstract

We generalize overpartitions to (k,j)-colored partitions: k-colored partitions in which each part size may have at most j colors. We find numerous congruences and other symmetries. We use a wide array of tools to prove our theorems: generating function dissections, modular forms, bijections, and other combinatorial maps. We find connections to divisor sums, the Han/Nekrasov-Okounkov hook length formula and a possible approach to a finitization, and other topics, suggesting that a rich mine of results is available., Comment: 17 pages. I thank Jeremy Rouse for a particular lemma on MathOverflow

Published

2014

37. Ramanujan-type Congruences for Overpartitions Modulo 16

Author

Chen, William Y. C., Hou, Qing-Hu, Sun, Lisa H., and Zhang, Li

Subjects

Mathematics - Combinatorics, Mathematics - Number Theory, 05A17, 11P83

Abstract

Let $\overline{p}(n)$ denote the number of overpartitions of $n$. Recently, Fortin-Jacob-Mathieu and Hirschhorn-Sellers independently obtained 2-, 3- and 4-dissections of the generating function for $\overline{p}(n)$ and derived a number of congruences for $\overline{p}(n)$ modulo $4$, $8$ and $64$ including $\overline{p}(5n+2)\equiv 0 \pmod{4}$, $\overline{p}(4n+3)\equiv 0 \pmod{8}$ and $\overline{p}(8n+7)\equiv 0 \pmod{64}$. By employing dissection techniques, Yao and Xia obtained congruences for $\overline{p}(n)$ modulo $8, 16$ and $32$, such as $\overline{p}(48n+26) \equiv 0 \pmod{8}$, $\overline{p}(24n+17)\equiv 0 \pmod{16}$ and $\overline{p}(72n+69)\equiv 0 \pmod{32}$. In this paper, we give a 16-dissection of the generating function for $\overline{p}(n)$ modulo 16 and we show that $\overline{p}(16n+14)\equiv0\pmod{16}$ for $n\ge 0$. Moreover, by using the $2$-adic expansion of the generating function of $\overline{p}(n)$ due to Mahlburg, we obtain that $\overline{p}(\ell^2n+r\ell)\equiv0\pmod{16}$, where $n\ge 0$, $\ell \equiv -1\pmod{8}$ is an odd prime and $r$ is a positive integer with $\ell \nmid r$. In particular, for $\ell=7$, we get $\overline{p}(49n+7)\equiv0\pmod{16}$ and $\overline{p}(49n+14)\equiv0\pmod{16}$ for $n\geq 0$. We also find four congruence relations: $\overline{p}(4n)\equiv(-1)^n\overline{p}(n) \pmod{16}$ for $n\ge 0$, $\overline{p}(4n)\equiv(-1)^n\overline{p}(n)\pmod{32}$ for $n$ being not a square of an odd positive integer, $\overline{p}(4n)\equiv(-1)^n\overline{p}(n)\pmod{64}$ for $n\not\equiv 1,2,5\pmod{8}$ and $\overline{p}(4n)\equiv(-1)^n\overline{p}(n)\pmod{128}$ for $n\equiv 0\pmod{4}$., Comment: 12 pages

Published

2014

38. An explicit approach to the Ahlgren-Ono conjecture

Author

Smith, Geoffrey D. and Ye, Lynnelle

Subjects

Mathematics - Number Theory, 05A17, 11P83

Abstract

Let $p(n)$ be the partition function. Ahlgren and Ono conjectured that every arithmetic progression contains infinitely many integers $N$ for which $p(N)$ is not congruent to $0\pmod{3}$. Radu proved this conjecture in 2010 using work of Deligne and Rapoport. In this note, we give a simpler proof of Ahlgren and Ono's conjecture in the special case where the modulus of the arithmetic progression is a power of $3$ by applying a method of Boylan and Ono and using work of Bella\"iche and Khare generalizing Serre's results on the local nilpotency of the Hecke algebra., Comment: 5 pages

Published

2014

39. Ramanujan-type Congruences for Overpartitions Modulo 5

Author

Chen, William Y. C., Sun, Lisa H., Wang, Rong-Hua, and Zhang, Li

Subjects

Mathematics - Combinatorics, Mathematics - Number Theory, 05A17, 11P83

Abstract

Let $\overline{p}(n)$ denote the number of overpartitions of $n$. Hirschhorn and Sellers showed that $\overline{p}(4n+3)\equiv 0 \pmod{8}$ for $n\geq 0$. They also conjectured that $\overline{p}(40n+35)\equiv 0 \pmod{40}$ for $n\geq 0$. Chen and Xia proved this conjecture by using the $(p,k)$-parametrization of theta functions given by Alaca, Alaca and Williams. In this paper, we show that $\overline{p}(5n)\equiv (-1)^{n}\overline{p}(4\cdot 5n) \pmod{5}$ for $n \geq 0$ and $\overline{p}(n)\equiv (-1)^{n}\overline{p}(4n)\pmod{8}$ for $n \geq 0$ by using the relation of the generating function of $\overline{p}(5n)$ modulo $5$ found by Treneer and the $2$-adic expansion of the generating function of $\overline{p}(n)$ due to Mahlburg. As a consequence, we deduce that $\overline{p}(4^k(40n+35))\equiv 0 \pmod{40}$ for $n,k\geq 0$. Furthermore, applying the Hecke operator on $\phi(q)^3$ and the fact that $\phi(q)^3$ is a Hecke eigenform, we obtain an infinite family of congrences $\overline{p}(4^k \cdot5\ell^2n)\equiv 0 \pmod{5}$, where $k\ge 0$ and $\ell$ is a prime such that $\ell\equiv3 \pmod{5}$ and $\left(\frac{-n}{\ell}\right)=-1$. Moreover, we show that $\overline{p}(5^{2}n)\equiv \overline{p}(5^{4}n) \pmod{5}$ for $n \ge 0$. So we are led to the congruences $\overline{p}\big(4^k5^{2i+3}(5n\pm1)\big)\equiv 0 \pmod{5}$ for $n, k, i\ge 0$. In this way, we obtain various Ramanujan-type congruences for $\overline{p}(n)$ modulo $5$ such as $\overline{p}(45(3n+1))\equiv 0 \pmod{5}$ and $\overline{p}(125(5n\pm 1))\equiv 0 \pmod{5}$ for $n\geq 0$., Comment: 11 pages

Published

2014

40. Arithmetic Properties of Andrews' Singular Overpartitions

Author

Chen, Shi-Chao, Hirschhorn, Michael D., and Sellers, James A.

Subjects

Mathematics - Number Theory, Mathematics - Combinatorics, 05A17, 11P83

Abstract

In a very recent work, G. E. Andrews defined the combinatorial objects which he called {\it singular overpartitions} with the goal of presenting a general theorem for overpartitions which is analogous to theorems of Rogers--Ramanujan type for ordinary partitions with restricted successive ranks. As a small part of his work, Andrews noted two congruences modulo 3 which followed from elementary generating function manipulations. In this work, we prove that Andrews' results modulo 3 are two examples of an infinite family of congruences modulo 3 which hold for that particular function. We also expand the consideration of such arithmetic properties to other functions which are part of Andrews' framework for singular overpartitions.

Published

2014

41. Congruences for 9-regular partitions modulo 3

Author

Keith, William J.

Subjects

Mathematics - Combinatorics, 05A17, 11P83

Abstract

It is proved that the number of 9-regular partitions of n is divisible by 3 when n is congruent to 3 mod 4, and by 6 when n is congruent to 13 mod 16. An infinite family of congruences mod 3 holds in other progressions modulo powers of 4 and 5. A collection of conjectures includes two congruences modulo higher powers of 2 and a large family of "congruences with exceptions" for these and other regular partitions mod 3., Comment: 7 pages. v2: added citations and proof of one conjecture from a reader. Submitted version

Published

2013

42. Congruences for Generalized Frobenius Partitions with an Arbitrarily Large Number of Colors

Author

Garvan, Frank G. and Sellers, James A.

Subjects

Mathematics - Number Theory, 05A17, 11P83

Abstract

In his 1984 AMS Memoir, George Andrews defined the family of $k$--colored generalized Frobenius partition functions. These are denoted by $c\phi_k(n)$ where $k\geq 1$ is the number of colors in question. In that Memoir, Andrews proved (among many other things) that, for all $n\geq 0,$ $c\phi_2(5n+3) \equiv 0\pmod{5}.$ Soon after, many authors proved congruence properties for various $k$--colored generalized Frobenius partition functions, typically with a small number of colors. Work on Ramanujan--like congruence properties satisfied by the functions $c\phi_k(n)$ continues, with recent works completed by Baruah and Sarmah as well as the author. Unfortunately, in all cases, the authors restrict their attention to small values of $k.$ This is often due to the difficulty in finding a "nice" representation of the generating function for $c\phi_k(n)$ for large $k.$ Because of this, no Ramanujan--like congruences are known where $k$ is large. In this note, we rectify this situation by proving several infinite families of congruences for $c\phi_k(n)$ where $k$ is allowed to grow arbitrarily large. The proof is truly elementary, relying on a generating function representation which appears in Andrews' Memoir but has gone relatively unnoticed.

Published

2013

43. Ramanujan-type Congruences for Broken 2-Diamond Partitions Modulo 3

Author

Chen, William Y. C., Fan, Anna R. B., and Yu, Rebecca T.

Subjects

Mathematics - Combinatorics, Mathematics - Number Theory, 05A17, 11P83

Abstract

The notion of broken $k$-diamond partitions was introduced by Andrews and Paule. Let $\Delta_k(n)$ denote the number of broken k-diamond partitions of $n$. They also posed three conjectures on the congruences of $\Delta_2(n)$ modulo 2, 5 and 25. Hirschhorn and sellers proved the conjectures for modulo 2, and Chan proved cases of modulo 5. For the case of modulo 3, Radu and Sellers obtained an infinite family of congruences for $\Delta_2(n)$. In this paper, we obtain two infinite families of congruences for $\Delta_2(n)$ modulo 3 based on a formula of Radu and Sellers, the 3-dissection formula of the generating function of triangular number due to Berndt, and the properties of the $U$-operator, the $V$-operator, the Hecke operator and the Hecke eigenform. For example, we find that $\Delta_2(243n+142)\equiv \Delta_2(243n+223)\equiv0\pmod{3}$. The infinite family of Radu and Sellers and the two infinite families derived in this paper have two congruences in common, namely, $\Delta_2(27n+16)\equiv\Delta_2(27n+25)\equiv0 \pmod{3}$., Comment: 10 pages, 3 figures

Published

2013

44. An Unexpected Congruence Modulo 5 for 4--Colored Generalized Frobenius Partitions

Author

Sellers, James A.

Subjects

Mathematics - Number Theory, 05A17, 11P83

Abstract

In his 1984 AMS Memoir, George Andrews defined the family of $k$--colored generalized Frobenius partition functions. These are denoted by $c\phi_k(n)$ where $k\geq 1$ is the number of colors in question. In that Memoir, Andrews proved (among many other things) that, for all $n\geq 0,$ $c\phi_2(5n+3) \equiv 0\pmod{5}.$ Soon after, many authors proved congruence properties for various $k$--colored generalized Frobenius partition functions, typically with a small number of colors. In 2011, Baruah and Sarmah proved a number of congruence properties for $c\phi_4$, all with moduli which are powers of 4. In this brief note, we add to the collection of congruences for $c\phi_4$ by proving this function satisfies an unexpected result modulo 5. The proof is elementary, relying on Baruah and Sarmah's results as well as work of Srinivasa Ramanujan.

Published

2013

45. Arithmetic properties of the $\ell$-regular partitions

Author

Cui, Suping and Gu, Nancy Shanshan

Subjects

Mathematics - Combinatorics, Mathematics - Number Theory, 05A17, 11P83

Abstract

For a given prime $p$, we study the properties of the $p$-dissection identities of Ramanujan's theta functions $\psi(q)$ and $f(-q)$, respectively. Then as applications, we find many infinite family of congruences modulo 2 for some $\ell$-regular partition functions, especially, for $\ell=2,4,5,8,13,16$. Moreover, based on the classical congruences for $p(n)$ given by Ramanujan, we obtain many more congruences for some $\ell$-regular partition functions.

Published

2013

46. On Chromatic Numbers of Integer and Rational Lattices

Author

Manturov, Vassily Olegovich

Subjects

Mathematics - Combinatorics, 05A17, 11P83

Abstract

In the present paper, we have found new upper bounds for chromatic numbers for integer lattices and some rational spaces and other lattices. In particular, we have proved that for any concrete critical distance $d$ the chromatic number of $\Z^{n}$ with critical distance $\sqrt{2d}$ has a polynomial growth in $n$ with exponent less than or equal to $d$ (sometimes this estimate is sharp). The same statement is true not only in the Euclidean norm, but also in any $l_{p}$ norm. Besides, we have given concrete estimates for some small dimensions as well as upper bounds for the chromatic number of $\Q_{p}^{n}$, where by $\Q_{p}$ we mean the ring of all rational numbers having denominators not divisible by some prime numbers., Comment: 15 pages

Published

2012

47. Polynomial analogues of Ramanujan congruences for Han's hooklength formula

Author

Keith, William J.

Subjects

Mathematics - Combinatorics, Mathematics - Number Theory, 05A17, 11P83

Abstract

This article considers the eta power $\prod {(1-q^k)}^{b-1}$. It is proved that the coefficients of $\frac{q^n}{n!}$ in this expression, as polynomials in $b$, exhibit equidistribution of the coefficients in the nonzero residue classes mod 5 when $n=5j+4$. Other symmetries, as well as symmetries for other primes and prime powers, are proved, and some open questions are raised., Comment: 13 pages; first presented at Integers Conference 2011. v2: version to appear, Acta Arithmetica; incorporates referee's comments

Published

2011

48. Combinatorial Telescoping for an Identity of Andrews on Parity in Partitions

Author

Chen, William Y. C., Du, Daniel K., and Mei, Charles B.

Subjects

Mathematics - Combinatorics, Mathematics - Number Theory, 05A17, 11P83

Abstract

Following the method of combinatorial telescoping for alternating sums given by Chen, Hou and Mu, we present a combinatorial telescoping approach to partition identities on sums of positive terms. By giving a classification of the combinatorial objects corresponding to a sum of positive terms, we establish bijections that lead a telescoping relation. We illustrate this idea by giving a combinatorial telescoping relation for a classical identity of MacMahon. Recently, Andrews posed a problem of finding a combinatorial proof of an identity on the q-little Jacobi polynomials which was derived based on a recurrence relation. We find a combinatorial classification of certain triples of partitions and a sequence of bijections. By the method of cancelation, we see that there exists an involution for a recurrence relation that implies the identity of Andrews., Comment: 12 pages, 5 figures

Published

2011

49. Arithmetic Properties of Overpartition Pairs

Author

Chen, William Y. C. and Lin, Bernard L. S.

Subjects

Mathematics - Combinatorics, Mathematics - Number Theory, 05A17, 11P83

Abstract

Bringmann and Lovejoy introduced a rank for overpartition pairs and investigated its role in congruence properties of $\bar{pp}(n)$, the number of overpartition pairs of n. In particular, they applied the theory of Klein forms to show that there exist many Ramanujan-type congruences for the number $\bar{pp}(n)$. In this paper, we shall derive two Ramanujan-type identities and some explicit congruences for $\bar{pp}(n)$. Moreover, we find three ranks as combinatorial interpretations of the fact that $\bar{pp}(n)$ is divisible by three for any n. We also construct infinite families of congruences for $\bar{pp}(n)$ modulo 3, 5, and 9., Comment: 19 pages

Published

2010

50. Congruences for Bipartitions with Odd Parts Distinct

Author

Chen, William Y. C. and Lin, Bernard L. S.

Subjects

Mathematics - Combinatorics, 05A17, 11P83

Abstract

Hirschhorn and Sellers studied arithmetic properties of the number of partitions with odd parts distinct. In another direction, Hammond and Lewis investigated arithmetic properties of the number of bipartitions. In this paper, we consider the number of bipartitions with odd parts distinct. Let this number be denoted by $pod_{-2}(n)$. We obtain two Ramanujan type identities for $pod_{-2}(n)$, which imply that $pod_{-2}(2n+1)$ is even and $pod_{-2}(3n+2)$ is divisible by 3. Furthermore, we show that for any $\alpha\geq 1$ and $n\geq 0$, $ pod_{-2}(3^{2\alpha+1}n+\frac{23\times 3^{2\alpha}-7}{8})$ is a multiple of 3 and $pod_{-2}(5^{\alpha+1}n+\frac{11\times 5^\alpha+1}{4})$ is divisible by 5. We also find combinatorial interpretations for the two congruences modulo 2 and 3., Comment: 15 pages

Published

2010