Abstract
In this work, we consider the function ped(n), the number of partitions of an integer n wherein the even parts are distinct (and the odd parts are unrestricted). Our goal is to consider this function from an arithmetical point of view in the spirit of Ramanujan's congruences for the unrestricted partition function p(n). We prove a number of results for ped(n) including the following: For all n≥0, ped(9n+4) ≡ 0 (mod 4) and ped(9n+7)≡ (mod 12). Indeed, we compute appropriate generating functions from which we deduce these congruences and find, in particular, the surprising result that We also show that ped(n) is divisible by 6 at least 1/6 of the time.
| Original language | English (US) |
|---|---|
| Pages (from-to) | 169-181 |
| Number of pages | 13 |
| Journal | Ramanujan Journal |
| Volume | 23 |
| Issue number | 1 |
| DOIs | |
| State | Published - Dec 2010 |
| Externally published | Yes |
Bibliographical note
Funding Information:Research of the first author supported in part by NSF Grant DMS-0801184.
Keywords
- Congruence
- Distinct even parts
- Generating function
- Lebesgue identity
- Partition