Record link: 
http://hdl.handle.net/20.500.12708/221882
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Title: 
Filters and ideals in pseudocomplemented posets
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Citation: 
Chajda, I., & Länger, H. (2025). Filters and ideals in pseudocomplemented posets. Soft Computing, 29, 5925–5932. https://doi.org/10.1007/s00500-025-10924-1
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Publisher DOI: 
10.1007/s00500-025-10924-1
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Publication Type: 
Article - Original Research Article
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Language: 
English
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Authors: 
Chajda, Ivan 
Länger, Helmut 
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Organisational Unit: 
E104-01 - Forschungsbereich Algebra 
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Journal: 
Soft Computing 
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ISSN: 
1432-7643
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Date (published): 
Dec-2025
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Number of Pages: 
8
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Publisher: 
SPRINGER
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Peer reviewed: 
Yes
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Keywords: 
pseudocomplemented poset; ideal; principal ideal; prime ideal; *-ideal; filter; principal filter; prime filter; ultrafilter; Boolean element; dense element; *-condition
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Abstract: 
We study ideals and filters of posets and of pseudocomplemented posets and show a version of the Separation Theorem, known for ideals and filters in lattices and semilattices, within this general setting. We extend the concept of a *-ideal already introduced by Rao for pseudocomplemented distributive lattices and by Talukder, Chakraborty and Begum for pseudocomplemented semilattices to pseudocomplemented posets. We derive several important properties of such ideals. Especially, we explain connections between prime filters, ultrafilters, filters satisfying the*-condition and dense elements. Finally, we prove a Separation Theorem for *-ideals.
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Project title: 
Die vielen Facetten der Orthomodularität: I 4579-N (FWF - Österr. Wissenschaftsfonds) 
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Project (external): 
Czech Science Foundation
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Project ID: 
20-09869L
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Research Areas: 
Beyond TUW-research focus: 100%
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Science Branch: 
1010 - Mathematik: 100%
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