Congruences modulo 4 for broken <Emphasis Type="Italic">k</Emphasis>-diamond partitions

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. Recently, a number of parity results satisfied by \(\Delta _k(n)\) for small values of k have been proved by Radu and Sellers and others. However, congruences modulo 4 for \(\Delta _k(n)\) are unknown. In this paper, we will prove five congruences modulo 4 for \(\Delta _5(n)\), four infinite families of congruences modulo 4 for \(\Delta _7(n)\) and one congruence modulo 4 for \(\Delta _{11}(n)\) by employing theta function identities. Furthermore, we will prove a new parity result for \(\Delta _2(n)\).     

Infinite families of congruences modulo 7 for broken 3-diamond partitions

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. Recently, Paule and Radu conjectured that \(\Delta _3(343n+82)\equiv \Delta _3(343n+278)\equiv \Delta _3(343n+327)\equiv 0\ (\mathrm{mod} \ 7)\). Jameson confirmed this conjecture and proved that \(\Delta _3(343n+229)\equiv 0 \ (\mathrm{mod} \ 7)\) by using the theory of modular forms. In this paper, we prove several infinite families of Ramanujan-type congruences modulo 7 for \(\Delta _3(n)\) by establishing a recurrence relation for a sequence related to \(\Delta _3(7n+5)\). In the process, we also give new proofs of the four congruences due to Paule and Radu, and Jameson.     

Some congruences for Andrews-Paule’s broken 2-diamond partitions

We prove two conjectures of Andrews and Paule [G.E. Andrews, P. Paule, MacMahon’s partition analysis XI: Broken diamonds and modular forms, Acta Arith. 126 (2007) 281-294] on congruences of broken k-diamond partitions.     

Newman’s identity and infinite families of congruences modulo 7 for broken 3-diamond partitions

In 2007, Andrews and Paule introduced the notion of broken k-diamond partitions. Let \(\Delta _k(n)\) denote the number of broken k-diamond partitions of n for a fixed positive integer k. Recently, Paule and Radu presented some conjectures on congruences modulo 7 for \(\Delta _3(n)\) which were proved by Jameson and Xiong based on the theory of modular forms. Very recently, Xia proved several infinite families of congruences modulo 7 for \(\Delta _3(n)\) using theta function identities. In this paper, many new infinite families of congruences modulo 7 for \(\Delta _3(n)\) are derived based on an identity of Newman and the (p; k)-parametrization of theta functions due to Alaca, Alaca and Williams. In particular, some non-standard congruences modulo 7 for \(\Delta _3(n)\) are deduced. For example, we prove that for \(\alpha \ge 0\), \(\Delta _3\left( \frac{14\times 757^{\alpha }+1}{3}\right) \equiv 6 -\alpha \ (\mathrm{mod}\ 7)\).     

Infinite families of strange partition congruences for broken 2-diamonds

In 2007, George E. Andrews and Peter Paule (Acta Arithmetica 126:281–294, 2007) introduced a new class of combinatorial objects called broken k-diamonds. Their generating functions connect to modular forms and give rise to a variety of partition congruences. In 2008, Song Heng Chan proved the first infinite family of congruences when k=2. In this note, we present two non-standard infinite families of broken 2-diamond congruences derived from work of Oliver Atkin and Morris Newman. In addition, four conjectures related to k=3 and k=5 are stated.     

Congruences for Broken k-Diamond Partitions

We prove two conjectures of Paule and Radu from their recent paper on broken k-diamond partitions.     

Ramanujan-type congruences modulo 8 for 7- and 23-core partition functions

Recently, Radu and Sellers proved numerous congruences modulo powers of 2 for \( (2k+1)\)-core partition functions by employing the theory of modular forms. In this paper, employing Ramanujan’s theta function identities, we prove many infinite families of congruences modulo 8 for 7-core partition function. Our results generalize the congruences modulo 8 for 7-core partition function discovered by Radu and Sellers. Furthermore, we present new proofs of congruences modulo 8 for 23-core partition function. These congruences were first proved by Radu and Sellers.     

Parity results for 13-regular partitions and broken 6-diamond partitions

Let \(b_{13}(n)\) denote the number of partitions of n such that no parts are divisible by 13. In this paper, we shall prove several infinite families of congruence relations modulo 2 for \(b_{13}(n)\). In addition, we will give an elementary proof of the parity result on broken 6-diamond partitions, which was established by Radu and Sellers. We also find a new congruence relation modulo 2 for the number of broken 6-diamond partitions of n.     

Congruences for broken 3-diamond and 7 dots bracelet partitions

Andrews and Paule introduced broken k-diamond partitions by using MacMahon’s partition analysis. Later, Fu found a generalization which he called k dots bracelet partitions. In this paper, with the aid of Farkas and Kra’s partition theorem and a p-dissection identity of f(?q), we derive many congruences for broken 3-diamond partitions and 7 dots bracelet partitions.     

Congruences for ?-regular partition functions modulo 3

Let b _ℓ (n) denote the number of ℓ-regular partitions of n. Recently Andrews, Hirschhorn, and Sellers proved that b ₄(n) satisfies two infinite families of congruences modulo 3, and Webb established an analogous result for b ₁₃(n). In this paper we prove similar families of congruences for b _ℓ (n) for other values of ℓ.     

The Andrews–Sellers family of partition congruences

In 1994, James Sellers conjectured an infinite family of Ramanujan type congruences for 2-colored Frobenius partitions introduced by George E. Andrews. These congruences arise modulo powers of 5. In 2002 Dennis Eichhorn and Sellers were able to settle the conjecture for powers up to 4. In this article, we prove Sellers’ conjecture for all powers of 5. In addition, we discuss why the Andrews–Sellers family is significantly different from classical congruences modulo powers of primes.     

Parity of sums of partition numbers and squares in arithmetic progressions

In this paper, we prove new infinite families of congruences modulo 2 for broken 11-diamond partitions by using Hecke operators.     

Congruences modulo 11 for broken 5-diamond partitions

The notion of broken k-diamond partitions was introduced by Andrews and Paule in 2007. For a fixed positive integer k, let \(\Delta _k(n)\) denote the number of broken k-diamond partitions of n. Recently, Paule and Radu conjectured two relations on \(\Delta _5(n)\) which were proved by Xiong and Jameson, respectively. In this paper, employing these relations, we prove that, for any prime p with \(p\equiv 1\ (\mathrm{mod}\ 4)\), there exists an integer \(\lambda (p)\in \{2,\ 3,\ 5,\ 6,\ 11\}\) such that, for \(n, \alpha \ge 0\), if \(p\not \mid (2n+1)\), then

$$\begin{aligned} \Delta _5\left( 11p^{\lambda (p)(\alpha +1)-1} n+\frac{11p^{\lambda (p)(\alpha +1)-1}+1}{2}\right) \equiv 0\ (\mathrm{mod}\ 11). \end{aligned}$$

Moreover, some non-standard congruences modulo 11 for \(\Delta _5(n)\) are deduced. For example, we prove that, for \(\alpha \ge 0\), \(\Delta _5\left( \frac{11\times 5^{5\alpha }+1}{2}\right) \equiv 7\ (\mathrm{mod}\ 11)\).

     

Congruences modulo 16, 32, and 64 for Andrews’s singular overpartitions

In a recent work, Andrews gave a definition of combinatorial objects which he called singular overpartitions and proved that these singular overpartitions, which depend on two parameters k and i, can be enumerated by the function \(\overline{C}_{k,i}(n) \) which denotes the number of overpartitions of n in which no part is divisible by k and only parts \(\equiv \pm i \ (\mathrm{mod}\ k)\) may be overlined. Andrews, Chen, Hirschhorn and Sellers, and Ahmed and Baruah discovered numerous congruences modulo 2, 3, 4, 8, and 9 for \(\overline{C}_{3,1}(n)\). In this paper, we prove a number of congruences modulo 16, 32, and 64 for \(\overline{C}_{3,1}(n)\).     

Congruences for ℓ-regular overpartition for ℓ ∈ {5, 6, 8}

Let A? _?(n) denote the number of overpartitions of a non-negative integer n with no part divisible by ?, where ? is a positive integer. In this paper, we prove infinite family of congruences for A? ₅(n) modulo 4, A? ₆(n) modulo 3, and A? ₈(n) modulo 4. In the process, we also prove some other congruences.     

Proof of a Lin-Peng-Toh's conjecture on an Andrews-Beck type congruence

Recently, Andrews proved two conjectures of Beck related to ranks of partitions. Very recently, Chern established some results on weighted rank and crank moments and proved many Andrews-Beck type congruences. Motivated by Andrews and Chern's work, Lin, Peng and Toh proved a number of Andrews-Beck type congruences for k-colored partitions. At the end of their paper, Lin, Peng and Toh posed several conjectures on Andrews-Beck type congruences. In this paper, we confirm one of those conjectures based on some q-series identities.     

Congruences of multipartition functions modulo powers of primes

Let p _r (n) denote the number of r-component multipartitions of n, and let S _γ,λ be the space spanned by η(24z) ^γ ?(24z), where η(z) is the Dedekind’s eta function and ?(z) is a holomorphic modular form in \(M_{\lambda}(\mathrm{SL}_{2}(\mathbb{Z}))\) . In this paper, we show that the generating function of \(p_{r}(\frac{m^{k} n +r}{24})\) with respect to n is congruent to a function in the space S _γ,λ modulo m ^k . As special cases, this relation leads to many well known congruences including the Ramanujan congruences of p(n) modulo 5,7,11 and Gandhi’s congruences of p ₂(n) modulo 5 and p ₈(n) modulo 11. Furthermore, using the invariance property of S _γ,λ under the Hecke operator \(T_{\ell^{2}}\) , we obtain two classes of congruences pertaining to the m ^k -adic property of p _r (n).     

Parity results for 9-regular partitions

Let t≥2 be an integer. We say that a partition is t-regular if none of its parts is divisible by t, and denote the number of t-regular partitions of n by b _t (n). In this paper, we establish several infinite families of congruences modulo 2 for b ₉(n). For example, we find that for all integers n≥0 and k≥0, $$b_9 \biggl(2^{6k+7}n+ \frac{2^{6k+6}-1}{3} \biggr)\equiv 0 \quad (\mathrm{mod}\ 2 ). $$      

A note on shifted convolution of cusp-forms with $$\theta $$-series

Recently Lachterman, Schayer, and Younger published an elegant proof of the Ramanujan congruences for the partition function p(n). Their proof uses only the classical theory of modular forms as well as a beautiful result of Choie, Kohnen, and Ono, without the need for Hecke operators. In this paper, we give a method for generalizing Lachterman, Schayer, and Younger’s proof to include Ramanujan congruences for multipartition functions \(p_k(n)\) and Ramanujan congruences for p(n) modulo certain prime powers.     

Congruences for Andrews’ (<Emphasis Type="Italic">k</Emphasis>, <Emphasis Type="Italic">i</Emphasis>)-singular overpartitions

Andrews recently defined new combinatorial objects which he called (k, i)-singular overpartitions and proved that they are enumerated by \(\overline{C}_{k,i}(n)\) which is the number of overpartitions of n in which no part is divisible by k and only the parts \(\equiv \pm i \pmod {k}\) may be overlined. Andrews further showed that \(\overline{C}_{3,1}(n)\) satisfies some Ramanujan-type congruences modulo 3. In this paper, we show that for any pair (k, i), \(\overline{C}_{k,i}(n)\) satisfies infinitely many Ramanujan-type congruences modulo any power of prime coprime to 6k. We also show that for an infinite family of k, the value \(\overline{C}_{3k,k}(n)\) is almost always even. Finally, we investigate the parity of \(\overline{C}_{4k,k}\).