English

The Partition-Frequency Enumeration Matrix

Number Theory 2026-02-02 v3 Combinatorics

Abstract

We develop a calculus that gives an elementary approach to enumerate partition-like objects using an infinite upper-triangular number-theoretic matrix. We call this matrix the Partition-Frequency Enumeration (PFE) matrix. This matrix unifies a large number of results connecting number-theoretic functions to partition-type functions. The calculus is extended to arbitrary generating functions, and functions with Weierstrass products. As a by-product, we recover (and extend) some well-known recurrence relations for many number-theoretic functions, including the sum of divisors function, Ramanujan's τ\tau function, sums of squares and triangular numbers, and for ζ(2n)\zeta(2n), where nn is a positive integer. These include classical results due to Euler, Ewell, Ramanujan, Lehmer and others. As one application, we embed Ramanujan's famous congruences p(5n+4)0p(5n+4)\equiv 0 (mod 5)5) and τ(5n+5)0\tau(5n+5)\equiv 0 (mod 5)5) into an infinite family of such congruences.

Keywords

Cite

@article{arxiv.2102.04191,
  title  = {The Partition-Frequency Enumeration Matrix},
  author = {Hartosh Singh Bal and Gaurav Bhatnagar},
  journal= {arXiv preprint arXiv:2102.04191},
  year   = {2026}
}

Comments

29 Pages (added refs based on feedback received). Minor typo fixed (p. 20, formula above Example 4.5)

R2 v1 2026-06-23T22:56:19.573Z