2025-02-23T00:46:31-05:00 DEBUG: VuFindSearch\Backend\Solr\Connector: Query fl=%2A&wt=json&json.nl=arrarr&q=id%3A%22irk-123456789-119636%22&qt=morelikethis&rows=5
2025-02-23T00:46:31-05:00 DEBUG: VuFindSearch\Backend\Solr\Connector: => GET http://localhost:8983/solr/biblio/select?fl=%2A&wt=json&json.nl=arrarr&q=id%3A%22irk-123456789-119636%22&qt=morelikethis&rows=5
2025-02-23T00:46:31-05:00 DEBUG: VuFindSearch\Backend\Solr\Connector: <= 200 OK
2025-02-23T00:46:31-05:00 DEBUG: Deserialized SOLR response
On matrices associated to prime factorization of odd integers
In this paper we introduce in section 5 integral matrices M(n) for any factorization of an odd integer n into r distinct odd primes. The matrices appear in several versions according to a parameter ρ ϵ 2 [0, 1]; they have size 2r * 2r and their rank satisfies e.g. for ρ = 1/2 the inequalities of t...
Saved in:
| Main Author: | |
|---|---|
| Format: | Article |
| Language: | English |
| Published: |
Інститут фізики конденсованих систем НАН України
2008
|
| Series: | Condensed Matter Physics |
| Online Access: | http://dspace.nbuv.gov.ua/handle/123456789/119636 |
| Tags: |
Add Tag
No Tags, Be the first to tag this record!
|
| Summary: | In this paper we introduce in section 5 integral matrices M(n) for any factorization of an odd integer n into r
distinct odd primes. The matrices appear in several versions according to a parameter ρ ϵ 2 [0, 1]; they have size
2r * 2r and their rank satisfies e.g. for ρ = 1/2 the inequalities of theorem 4: r + 1 ≤ rank(M(n)) ≤ 2r⁻¹+1;
which are obtained using theorem 1 discussed separately in the first few sections. The cases ρ = 0, 1, 1/2 are
analyzed in some detail, and various counterexamples for ρ != 0, 1, 1/2 are included. There are several main
results, theorem 5 is a duality between the cases ρ = 0 and ρ = 1, and theorem 6 is a periodicity theorem.
The most important result perhaps is theorem 8 (valid for ρ = 1/2 only) on the existence of odd squarefree
integers n with r odd prime factors such that rank(M(n)) = r + 1 attains the lower bound shown previously. |
|---|