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CPC
2008
2008
B2[ g] Sets and a Conjecture of Schinzel and Schmidt
![B2[ g] Sets and a Conjecture of Schinzel and Schmidt](https://www.sciweavers.org/files/imagecache/thumbnail/default/content.jpg "B2[ g] Sets and a Conjecture of Schinzel and Schmidt")
A set of integers A is called a B2[g] set if every integer m has at most g representations of the form m = a + a , with a a and a, a A. We obtain a new lower bound for F(g, n), the largest cardinality of a B2[g] set in {1, . . . , n}. More precisely, we prove that lim infn F (g,n) gn 2 - g where g 0 when g . We show a connection between this problem and another one discussed by Schinzel and Schmidt which can be considered its continuous version.
Real-time TrafficCPC 2008 | Infn | Integer | Largest Cardinality |
| Added | 10 Dec 2010 |
| Updated | 10 Dec 2010 |
| Type | Journal |
| Year | 2008 |
| Where | CPC |
| Authors | Javier Cilleruelo, Carlos Vinuesa |
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