On some infinite families of congruences for [j, k]-partitions into even parts distinct

被引：0

作者：

Naika, M. S. Mahadeva ^{[1
]}

Harishkumar, T. ^{[2
]}

Veeranayaka, T. N. ^{[2
]}

机构：

[1] Bengaluru City Univ, Dept Math, Cent Coll Campus, Bengaluru 560001, Karnataka, India

[2] Bangalore Univ, Dept Math, Cent Coll Campus, Bengaluru 560001, Karnataka, India

来源：

INDIAN JOURNAL OF PURE & APPLIED MATHEMATICS | 2021年 / 52卷 / 04期

关键词：

Congruences; Partitions with even parts distinct; j k]-partitions; ARITHMETIC PROPERTIES; PARTITIONS; BIPARTITIONS; NUMBER;

D O I：

10.1007/s13226-021-00046-3

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

In this paper, we define the partition function ped(j,k)(n), the number of [j, k]-partitions of n into even parts distinct, where none of the parts are congruent to j (mod k) (where k > j >= 1). We obtain many infinite families of congruences modulo powers of 2 for ped(3,6)(n) and congruences modulo powers of 2 and 3 for ped(9,18)(n). For example, for all n >= 0 and alpha, beta >= 0, ped(9),(18) (2 . 3(4 alpha+4) . 7(2 beta+1) (7n + s) + 11 . 3(4 alpha+3) . 7(2 beta+1) + 1/4) equivalent to 0 (mod 16), where s = 0, 2, 3, 4, 5, 6.

引用

页码：1038 / 1054

页数：17

共 31 条

[1] On some infinite families of congruences for [j, k]-partitions into even parts distinct
M. S. Mahadeva Naika
T. Harishkumar
T. N. Veeranayaka
Indian Journal of Pure and Applied Mathematics, 2021, 52 : 1038 - 1054
[2] Congruences for [j,k] - overpartitions with even parts distinct
Naika, M. S. Mahadeva
Harishkumar, T.
Veeranayaka, T. N.
BOLETIN DE LA SOCIEDAD MATEMATICA MEXICANA, 2022, 28 (02):
[3] New congruences for [j,k]-overpartitions with even parts distinct
da Silva, Robson
Gama, Marcelo C.
BOLETIN DE LA SOCIEDAD MATEMATICA MEXICANA, 2025, 31 (01):
[4] Congruences for the number of partitions and bipartitions with distinct even parts
Dai, Haobo
DISCRETE MATHEMATICS, 2015, 338 (03) : 133 - 138
[5] Infinite families of infinite families of congruences for k-regular partitions
Rowland Carlson
John J. Webb
The Ramanujan Journal, 2014, 33 : 329 - 337
[6] Infinite families of infinite families of congruences for k-regular partitions
Carlson, Rowland
Webb, John J.
RAMANUJAN JOURNAL, 2014, 33 (03) : 329 - 337
[7] Congruences modulo 16, 32 and 64 for bipartitions with distinct even parts
Liu, Eric H.
Yao, Olivia X. M.
Zhao, Tao Yan
ARS COMBINATORIA, 2018, 140 : 301 - 310
[8] Congruences for the number of 4-tuple partitions with distinct even parts
Dai, Haobo
INTERNATIONAL JOURNAL OF NUMBER THEORY, 2014, 10 (08) : 2037 - 2043
[9] NEW CONGRUENCES AND DENSITY RESULTS FOR t-REGULAR PARTITIONS WITH DISTINCT EVEN PARTS
Singh, Ajit
ROCKY MOUNTAIN JOURNAL OF MATHEMATICS, 2024, 54 (06) : 1731 - 1731
[10] Ramanujan-type congruences modulo 4 for partitions into distinct parts
Merca, Mircea
ANALELE STIINTIFICE ALE UNIVERSITATII OVIDIUS CONSTANTA-SERIA MATEMATICA, 2022, 30 (03): : 185 - 199

← 1 2 3 4 →