A note on topological representations of distributive lattices
Ladislav Rieger (1949)
Časopis pro pěstování matematiky a fysiky
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Displaying similar documents to “Quasicomplemented lattices”
A note on topological representations of distributive lattices
On n-normal posets
Radomír Halaš, Vinayak Joshi, Vilas Kharat (2010)
Open Mathematics
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A poset Q is called n-normal, if its every prime ideal contains at most n minimal prime ideals. In this paper, using the prime ideal theorem for finite ideal distributive posets, some properties and characterizations of n-normal posets are obtained.
Ideals in distributive posets
Cyndyma Batueva, Marina Semenova (2011)
Open Mathematics
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We prove that any ideal in a distributive (relative to a certain completion) poset is an intersection of prime ideals. Besides that, we give a characterization of n-normal meet semilattices with zero, thus generalizing a known result for lattices with zero.
Topological representations of distributive lattices and Brouwerian logics
Marshall Harvey Stone (1938)
Časopis pro pěstování matematiky a fysiky
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Prime ideals in 0-distributive posets
Vinayak Joshi, Nilesh Mundlik (2013)
Open Mathematics
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In the first section of this paper, we prove an analogue of Stone’s Theorem for posets satisfying DCC by using semiprime ideals. We also prove the existence of prime ideals in atomic posets in which atoms are dually distributive. Further, it is proved that every maximal non-dense (non-principal) ideal of a 0-distributive poset (meet-semilattice) is prime. The second section focuses on the characterizations of (minimal) prime ideals in pseudocomplemented posets. The third section deals...
On prime ideals of
Attilio Le Donne (1977)
Rendiconti del Seminario Matematico della Università di Padova
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Polars in distributive lattices with the smallest element
František Fiala (1970)
Archivum Mathematicum
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