JEDNOSTKA NAUKOWA KATEGORII A+

Artykuły w formacie PDF dostępne są dla subskrybentów, którzy zapłacili za dostęp online, po podpisaniu licencji Licencja użytkownika instytucjonalnego. Czasopisma do 2009 są ogólnodostępne (bezpłatnie).

Certain Diophantine equations and new parity results for 21-regular partitions

Tom 210 / 2023

Ajit Singh, Gurinder Singh, Rupam Barman Acta Arithmetica 210 (2023), 337-351 MSC: Primary 11D09; Secondary 11D45, 11P83. DOI: 10.4064/aa230203-5-7 Opublikowany online: 13 September 2023

Streszczenie

For a positive integer $t\geq 2$, let $b_{t}(n)$ denote the number of $t$-regular partitions of a non-negative integer $n$. In a recent paper, Keith and Zanello (2022) investigated the parity of $b_{t}(n)$ when $t\leq 28$. They discovered new infinite families of Ramanujan type congruences modulo 2 for $b_{21}(n)$ involving every prime $p$ with $p\equiv 13, 17, 19, 23 \pmod{24}$. In this paper, we investigate the parity of $b_{21}(n)$ involving the primes $p$ with $p\equiv 1, 5, 7, 11 \pmod{24}$. We prove new infinite families of Ramanujan type congruences modulo 2 for $b_{21}(n)$ involving the odd primes $p$ for which the Diophantine equation $8x^2+27y^2=jp$ has primitive solutions for some $j\in \lbrace 1,4,8\rbrace $, and we also prove that the Dirichlet density of such primes is equal to $1/6$. Recently, Yao (2023) provided new infinite families of congruences modulo $2$ for $b_{3}(n)$; those congruences involve every prime $p\geq 5$ based on Newman’s results. Following a similar approach, we prove new infinite families of congruences modulo $2$ for $b_{21}(n)$; these congruences imply that $b_{21}(n)$ is odd infinitely often.

Autorzy

  • Ajit SinghDepartment of Mathematics
    Indian Institute of Technology Guwahati
    Assam, India, 781039
    e-mail
  • Gurinder SinghDepartment of Mathematics
    Indian Institute of Technology Guwahati
    Assam, India, 781039
    e-mail
  • Rupam BarmanDepartment of Mathematics
    Indian Institute of Technology Guwahati
    Assam, India, 781039
    e-mail

Przeszukaj wydawnictwa IMPAN

Zbyt krótkie zapytanie. Wpisz co najmniej 4 znaki.

Przepisz kod z obrazka

Odśwież obrazek

Odśwież obrazek