Completely settling of the multiplier conjecture for the case of \(n=3p^r\) (Q2767436)
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scientific article; zbMATH DE number 1697446
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Completely settling of the multiplier conjecture for the case of \(n=3p^r\) |
scientific article; zbMATH DE number 1697446 |
Statements
29 January 2002
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difference set
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multiplier
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Completely settling of the multiplier conjecture for the case of \(n=3p^r\) (English)
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The multiplier conjecture states that a prime \(p\) dividing the order \(n=k-\lambda\) of an abelian \((v,k,\lambda)\)-difference set \(D\) but not \(v\) is a multiplier for \(p\). The author announces that \(p\) is indeed a multiplier provided that \(n\) has the form \(n=3p^r\). The note under review contains no proofs, and it is not indicated where these might be found.
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0.8976649641990662
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0.8934135437011719
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0.8932125568389893
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