Counting \(k\)-convex polyominoes (Q396773)
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scientific article; zbMATH DE number 6330264
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Counting \(k\)-convex polyominoes |
scientific article; zbMATH DE number 6330264 |
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Counting \(k\)-convex polyominoes (English)
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14 August 2014
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Summary: We compute an asymptotic estimate of a lower bound of the number of \(k\)-convex polyominoes of semiperimeter \(p\). This approximation can be written as \(\mu(k) p 4^p\) where \(\mu(k)\) is a rational fraction of \(k\) which up to \(\mu(k)\) is the asymptotics of convex polyominoes.
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convex polyominoes
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0.9295269
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0.9292859
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0.9292859
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0.9149505
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0.91365874
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