The Partition-Frequency Enumeration Matrix
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 function, sums of squares and triangular numbers, and for , where 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 (mod and (mod into an infinite family of such congruences.
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)