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On reducible and primitive subsets of F_p, II |
Tartalom: | http://real.mtak.hu/32860/ |
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Archívum: | MTA Könyvtár |
Gyűjtemény: |
Status = Published
Type = Article |
Cím: |
On reducible and primitive subsets of F_p, II
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Létrehozó: |
Gyarmati, Katalin
Sárközy, András
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Dátum: |
2015
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Téma: |
QA Mathematics / matematika
QA71 Number theory / számelmélet
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Tartalmi leírás: |
In Part I of this paper we introduced and studied the notion of reducibility and primitivity of subsets of F_p: a set A is said to be reducible if it can be represented in the form A = B + C with |B|, |C| > 1. Here we introduce and study strong form of primitivity and reducibility:
a set A is said to be k-primitive if changing at most k elements of it we always get a primitive set, and it is said to be k - reducible if it has a representation in the form A = B_1 + B_2 + ... + B_k with |B_1|, |B_2|, ..., |B_k| > 1. |
Nyelv: |
magyar
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Típus: |
Article
NonPeerReviewed
info:eu-repo/semantics/article
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Formátum: |
text
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Azonosító: |
Gyarmati, Katalin and Sárközy, András (2015) On reducible and primitive subsets of F_p, II. Quarterly Journal of Mathematics. pp. 1-5.
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Kapcsolat: |
10.1093/qmath/hav032
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