Arithmetic of General Partition Functions $p_r(n)$ Modulo Primes

Auteurs-es

  • B. R. Srivatsa Kumar Department of Mathematics, Manipal Institute of Technology, Manipal Academy of Higher Education, Manipal - 576 104, India
  • H. S. Manu Banakar Department of Mathematics, Manipal Institute of Technology, Manipal Academy of Higher Education, Manipal - 576 104, India
  • R. G. Veeresha Department of Mathematics, Sri Jayachamarajendra College of Engineering, JSS Science and Technology University, Manasagangotri, Mysuru-570006, Karnataka

DOI :

https://doi.org/10.5269/bspm.79799

Résumé

In the present investigation, we establish several new infinite families of congruences for the generalized partition function $p_r(n)$. Our emphasis throughout this paper is on demonstrating how classical and modern $q$-identities can be effectively employed to derive these congruences. By systematically applying these identities, we uncover congruences modulo primes such as 19, 23 and 29, valid for all positive integers $\lambda$. This approach not only yields elegant arithmetic results but also highlights the deep interplay between partition theory and the analytic properties of $q$-series.

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Publié

2026-03-12

Numéro

Vol. 44 No. 9 (2026): Advanced Computational Methods for Fractional Calculus

Rubrique

Special Issue: Advanced Computational Methods for Fractional Calculus

Licence

When the manuscript is accepted for publication, the authors agree automatically to transfer the copyright to the (SPM).

The journal utilize the Creative Common Attribution (CC-BY 4.0).

 

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