# Untrodden pathways in the theory of the restricted partition function   $p(n, N)$

**Authors:** Atul Dixit, Pramod Eyyunni, Bibekananda Maji, Garima Sood

arXiv: 1812.01424 · 2018-12-05

## TL;DR

This paper develops finite analogues of classical partition identities, including rank and crank functions, and proves inequalities and identities related to the restricted partition function $p(n, N)$, extending the theory significantly.

## Contribution

It introduces finite analogues of rank, crank, and their moments for the restricted partition function, expanding the theoretical framework of partition identities.

## Key findings

- Finite analogue of a Ramanujan identity obtained.
- Proved an inequality between finite second rank and crank moments.
- Derived finite analogues of divisor, largest parts functions, and Beck-Chern theorem.

## Abstract

We obtain a finite analogue of a recent generalization of an identity in Ramanujan's Notebooks. Differentiating it with respect to one of the parameters leads to a result whose limiting case gives a finite analogue of Andrews' famous identity for $\textup{spt}(n)$. The latter motivates us to extend the theory of the restricted partition function $p(n, N)$, namely, the number of partitions of $n$ with largest parts less than or equal to $N$, by obtaining the finite analogues of rank and crank for vector partitions as well as of the rank and crank moments. As an application of the identity for our finite analogue of the spt-function, namely $\textup{spt}(n, N)$, we prove an inequality between the finite second rank and crank moments. The other results obtained include finite analogues of a recent identity of Garvan, an identity relating $d(n, N)$ and lpt$(n, N)$, namely the finite analogues of the divisor and largest parts functions respectively, and a finite analogue of the Beck-Chern theorem. We also conjecture an inequality between the finite analogues of $k^{\textup{th}}$ rank and crank moments.

## Full text

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## References

53 references — full list in the complete paper: https://tomesphere.com/paper/1812.01424/full.md

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Source: https://tomesphere.com/paper/1812.01424