Abstract
We define \(q^\prime\)-compact pseudocomplemented semilattice for pseudocomplemented semilattices and we attempt to give a characterization for a pseudocomplemented semilattice to be strongly algebraically closed, building on the characterization of the algebraically closed pseudocomplemented semilattice given by Adler, Rupp, and Schmid (Algebra Universalis 70:287–308, 2013).
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
Data availability
Not applicable.
Materials availability
Data sharing is not applicable to this article as no datasets were generated or analyzed during the current study.
References
M.H. Albert and S.N. Burris, Finite axiomatizations for existentially closed posets and semilattices, Order, 3 (1986) 169-178,
G. Czédli and E.T. Schmidt, Finite distributive lattices are congruence lattices of almost-geometric lattices, Algebra Universalis, 65 (2011) 91-108.
G. Czédli and A. Molkhasi, Absolute retracts for finite distributive lattices and slim semimodular lattices, Order, (2022).
A. Di Nola and A. Lettieri, Equational characterization of all varieties of MV-algebras, J. Algebra, 221 (1999) 463-474.
E. Daniyarova, A. Miasnikov and V. Remeslennikov, Unification theorems in algebraic geometry, Algebra and Discrete Mathematics, 1 (2008) 80-112.
B. Dushnik and E.W, Miller, Partially ordered sets, Amer. J. Math. 63 (1941) 600-610.
R.P. Dilworth, A decomposition theorem for partially ordered sets, Ann. of Math. 2 (51) (1950) 161-166.
G. Gratzer, Lattice Theory: Foundation, Birkh auser/Springer Basel AG, Basel, 2011. MR 2768581 (2012f:06001)
G. Gratzer, Finite lattices and congruences, A survey. Algebra Universalis, 52 (2004) 241-278.
G. Gratzer, E.T. Schmidt, and K. Thomsen, Congruence lattices of uniform lattices, Houston J. Math. 29 (2003) 247-263.
A. Myasnikov and V. Remeslennikov, Algebraic geometry over groups II: logical foundations, J. Algebra, 234 (2000) 225-276.
A. Molkhasi, On strongly algebraically closed lattices. Zh. Sib. Fed. Univ. Mat. Fiz. 9 (2016) 202-208.
A. Molkhasi, Strongly algebraically closed lattices in ℓ-groups and semilattices, Zh. Sib. Fed. Univ. Mat. Fiz. 11 (2018) 258-263.
A. Molkhasi, On strongly algebraically closed orthomodular lattices, Southeast Asian Bull. Math. 42 (2018) 83-88.
A. Molkhasi, Refinable and strongly algebraically closed lattices, Southeast Asian Bull. Math. 44 (2020) 673-680.
A. Molkhasi, Representations of Sheffer stroke algebras and Visser algebras, Soft Computing, 25 (2021) 8533-8538.
E.C. Milner and M. Pouzet, A note on the dimension of a poset, Order, 7 (1990) 101-102.
B. Plotkin, Algebras with the same (algebraic) geometry, Proc. Steklov Inst. Math. 242 (2003) 165-196.
R. Rupp, J. Adler, and J. Schmid, The class of algebraically closed P-semilattices is finitely axiomatizable, Algebra Universalis, 70 (2013) 287-308.
I. Rabinovitch and I. Rival, The rank of a distributive lattice, Discrete Math. 25 (1979) 275-279.
J. Schmid, Algebraically and existentially closed distributive lattices, Zeilschr Math. Logik und Crztndlagen d. Math. Bd. 25 (1979) 525-530.
A. Shevlyakov, Algebraic geometry over Boolean algebras in the language with constants, J. Math. Scieces, 206 (2015) 724-757.
Author information
Authors and Affiliations
Contributions
The authors have contributed significantly and equally in writing this article. All authors have read and approved the final manuscript.
Corresponding author
Ethics declarations
Competing interests
The authors declare no competing interests.
Rights and permissions
Springer Nature or its licensor (e.g. a society or other partner) holds exclusive rights to this article under a publishing agreement with the author(s) or other rightsholder(s); author self-archiving of the accepted manuscript version of this article is solely governed by the terms of such publishing agreement and applicable law.
About this article
Cite this article
Molkhasi, A., Akbari, Z. STRONGLY ALGEBRAICALLY CLOSED P-SEMILATTICES. J Math Sci 271, 31–36 (2023). https://doi.org/10.1007/s10958-023-06258-8
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s10958-023-06258-8