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http://dx.doi.org/10.4134/BKMS.b170236

A CHARACTERIZATION OF n-POSETS OF LD n - k WITH SIMPLE POSETS  

Chae, Gab-Byung (Division of Mathematics and Informational Statistics Wonkwang University)
Cheong, Minseok (Information Security Convergence College of Informatics Korea University)
Kim, Sang-Mok (Department of Mathematics Kwangwoon University)
Publication Information
Bulletin of the Korean Mathematical Society / v.55, no.3, 2018 , pp. 777-788 More about this Journal
Abstract
A simple poset is a poset whose linear discrepancy increases if any relation of the poset is removed. In this paper, we investigate more important properties of simple posets such as its width and height which help to construct concrete simple poset of linear discrepancy l. The simplicity of a poset is similar to the ld-irreducibility of a poset. Hence, we investigate which posets are both simple and ld-irreducible. Using these properties, we characterize n-posets of linear discrepancy n - k for k = 2, 3, and, lastly, we also characterize a poset of linear discrepancy 3 with simple posets and ld-irreducible posets.
Keywords
poset; linear discrepancy; ld-irreducible poset; simple poset;
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