A generalization of a theorem of Erné about the number of posets with a fixed antichain
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Publication:2088069
DOI10.1007/s11083-021-09585-0OpenAlexW3214189413MaRDI QIDQ2088069
Publication date: 21 October 2022
Published in: Order (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11083-021-09585-0
Cites Work
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- Posets on up to 16 points
- On the cardinalities of finite topologies and the number of antichains in partially ordered sets
- Counting finite posets and topologies
- On the cardinalities of finite topologies
- A framework for the systematic determination of the posets on \(n\) points with at least \(\tau \cdot 2^n\) downsets
- The number of partially ordered sets
- Struktur- und Anzahlformeln für Topologien auf endlichen Mengen
- Exponential functions of finite posets and the number of extensions with a fixed set of minimal points
- Quasi-Orderings and Topologies on Finite Sets
- Cardinality of finite topologies
- The number of unlabeled orders on fourteen elements
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