2018
DOI: 10.1007/s00012-018-0567-z
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The canonical join complex for biclosed sets

Abstract: The canonical join complex of a semidistributive lattice is a simplicial complex whose faces are canonical join representations of elements of the semidistributive lattice. We give a combinatorial classification of the faces of the canonical join complex of the lattice of biclosed sets of segments supported by a tree, as introduced by the third author and McConville. We also use our classification to describe the elements of the shard intersection order of the lattice of biclosed sets. As a consequence, we pro… Show more

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Cited by 7 publications
(8 citation statements)
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“…Remark 5.3 A version of this poset of labels S has already been introduced in [7]. There the notion of segments plays the role of strings.…”
Section: Biclosed Sets and Biclosed Subcategoriesmentioning
confidence: 99%
See 3 more Smart Citations
“…Remark 5.3 A version of this poset of labels S has already been introduced in [7]. There the notion of segments plays the role of strings.…”
Section: Biclosed Sets and Biclosed Subcategoriesmentioning
confidence: 99%
“…There the notion of segments plays the role of strings. Many of the proofs [7] are applicable to the current work, and so we will frequently cite [7] in the sequel. We leave it to the reader to translate the relevant statements in terms of segments from [7] into statements in terms of strings in the current work.…”
Section: Biclosed Sets and Biclosed Subcategoriesmentioning
confidence: 99%
See 2 more Smart Citations
“…This order has been dubbed the core label order in [15], denoted by CLO(L), and it has interesting combinatorial properties. In certain special cases the core label order was investigated in [1,5,11,12,14,16,17]. A general study of the core label order of a congruence-uniform lattice was carried out in [15].…”
Section: Introductionmentioning
confidence: 99%