Abstract
The notion of the (dual) hull-kernel topology on a collection of prime filters in a residuated lattice is introduced and investigated. It is observed that any collection of prime filters is a \(T_0\) topological space under the (dual) hull-kernel topology. It is proved that any collection of prime filters is a \(T_1\) space if and only if it is an antichain, and it is a Hausdorff space if and only if it satisfies some certain conditions. Some characterizations in which maximal filters form a Hausdorff space are given. In the end, we focus on the space of minimal prim filters, and verify that this space is totally disconnected Hausdorff. This paper is closed by description of the compactness of the space of the minimal prime filters using the space of prime \(\alpha \)-filters.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
Explore related subjects
Discover the latest articles, news and stories from top researchers in related subjects.References
Arens RF, Kaplansky I (1948) Topological representation of algebras. Trans Am Math Soc 63(3):457–481
Atiyah MF, Macdonald IG (1969) ‘Introduction to commutative algebra addison’
Banaschewski B (2000) Gelfand and exchange rings: their spectra in pointfree topology. Arab J Sci Eng 25:3–22
Birkhoff G (1933) On the combination of subalgebras. In: Mathematical Proceedings of the Cambridge Philosophical Society’, Vol. 29, Cambridge University Press, pp. 441–464
Bourbaki N (1972) Commutative algebra, vol 8. Hermann, Paris
Buşneag D, Piciu D (2006) Residuated lattice of fractions relative to a \(\wedge \)-closed system, Bull math Soc Sc Math Roum 49(97)(1):13–24
Buşneag D, Piciu D, Jeflea A (2010) Archimedean residuated lattices. Ann Alexandru Ioan Cuza Univ Math 56(1):227–252
Ciungu LC (2006) Classes of residuated lattices. Ann Univ Craiova-Math Comput Sci Ser 33:189–207
Contessa M (1982) On pm-rings. Commun Algebra 10(1):93–108
De Marco G (1983) Projectivity of pure ideals. Rendiconti del Seminario Matematico della Università di Padova 69:289–304
De Marco G, Orsatti A (1971) Commutative rings in which every prime ideal is contained in a unique maximal ideal. Proc Am Math Soc 30(3):459–466
Dickmann M, Schwartz N, Tressl M (2019) Spectral spaces, vol 35. Cambridge University Press, Cambridge
Dobbs DE, Fontana M, Papick IJ (1981) On the flat spectral topology. Rend Mat 1(4):559–578
Dong YY, Xin XL (2019) \(\alpha \)-filters and prime \(\alpha \)-filter spaces in residuated lattices. Soft Comput 23(10):3207–3216
Engelking R (1989) General topology, Heldermann
Galatos N, Jipsen P, Kowalski T, Ono H (2007) Residuated lattices: an algebraic glimpse at substructural logics, vol 151. Elsevier, Amsterdam
García-Pardo F, Cabrera IP, Cordero P, Ojeda-Aciego M (2013) On galois connections and soft computing. In: International Work-Conference on Artificial Neural Networks, Springer, pp. 224–235
Gelfand I, Kolmogoroff A (1939) On rings of continuous functions on topological spaces. Doklady Akad Nauk SSSR 22:11–15
Georgescu G, Cheptea D, Mureşan C (2015) Algebraic and topological results on lifting properties in residuated lattices. Fuzzy Sets Syst 271:102–132
Georgescu G, Mureşan C (2014) Boolean lifting property for residuated lattices. Soft Comput 18(11):2075–2089
Gillman L (1958) Rings with hausdorff structure space. Fundam Math 1(45):1–16
Gleason AM et al (1958) Projective topological spaces. Ill J Math 2(4A):482–489
Grätzer G (2011) Lattice theory: foundation. Springer Science & Business Media, Berlin
Grothendieck A (1958a) The cohomology theory of abstract algebraic varieties. In: Proceedings of the International Congress of Mathematicians, pp. 103–118
Grothendieck A (1958) b), ‘Géométrie formelle et géométrie algébrique’. Séminaire Bourbaki 5(11)
Grothendieck A, Dieudonné J (1960) ‘Eléments de géométrie algébrique, tome i, le langage des schémas, ihes publ’
Grothendieck A, Dieudonné J, Dieudonné J (1971) Eléments de géométrie algébrique, vol 166. Springer, Berlin
Henriksen M, Jerison M (1965) The space of minimal prime ideals of a commutative ring. Trans Am Math Soc 115:110–130
Hochster M (1969) Prime ideal structure in commutative rings. Trans Am Math Soc 142:43–60
Idziak PM (1984) Lattice operations in bck-algebras. Math Jpn 29:839–846
Jacobson N (1945) A topology for the set of primitive ideals in an arbitrary ring. Proc Nat Acad Sci USA 31(10):333
Jayaram C (1986) Prime-ideals in a 0-distributive lattice. Indian J Pure Appl Math 3:331–337
Johnstone PT (1982) Stone spaces, vol 3. Cambridge University Press, Cambridge
Kaplansky I (1950) Topological representation of algebras. ii. Trans Am Math Soc 68(1):62–75
Keimel K (1971) The representation of lattice-ordered groups and rings by sections in sheaves, in ‘Lectures on the Applications of Sheaves to Ring Theory’. Springer 1–98
Kist J (1963) Minimal prime ideals in commutative semigroups. Proc Lond Math Soc 3(1):31–50
Leuştean L (2003) The prime and maximal spectra and the reticulation of bl-algebras. Cent Eur J Math 3:382–397
MacNeille HM (1936) Extensions of partially ordered sets. Proc Nat Acad Sci USA 22(1):45
Magid A (1971) Galois groupoids. J Algebra 18(1):89–102
Mulvey CJ (1979) A generalisation of gelfand duality. J Algebra 56(2):499–505
Mundlik N, Joshi V, Halaš R (2017) The hull-kernel topology on prime ideals in posets. Soft Comput 21(7):1653–1665
Pawar Y (1994) Characterizations of normal lattices. Indian J Pure Appl Math 24:651
Pawar Y, Shaikh I (2012) The space of prime \(\alpha \)-ideals of an almost distributive lattice. Int J Algebra 6(13):637–649
Pawar Y, Thakare N (1977) pm-lattices. Algebra universalis 7(1):259–263
Rasouli S (2018) Generalized co-annihilators in residuated lattices. Ann Univ Craiova-Math Comput Sci Ser 45(2):190–207
Rasouli S (2019) The going-up and going-down theorems in residuated lattices. Soft Comput 23(17):7621–7635. https://doi.org/10.1007/s00500-019-03780-3
Rasouli S (2020) a), Generalized stone residuated lattices. Algebraic Struct Appl
Rasouli S (2020b) Quasicomplemented residuated lattices. Soft Comput 24:6591–6602. https://doi.org/10.1007/s00500-020-04778-y
Rasouli S, Davvaz B (2015) An investigation on boolean prime filters in bl-algebras. Soft Comput 19(10):2743–2750. https://doi.org/10.1007/s00500-015-1711-8
Rasouli S, Kondo M (2020) n-normal residuated lattices. Soft Comput 24(1):247–258. https://doi.org/10.1007/s00500-019-04346-z
Rump W, Yang YC (2008) Jaffard-ohm correspondence and hochster duality. Bull Lond Math Soc 40(2):263–273
Rump W, Yang YC (2009) Lateral completion and structure sheaf of an archimedean l-group. J Pure Appl Algebra 213(1):136–143
Schwartz N (2013) Sheaves of abelian l-groups. Order 30(2):497–526
Speed T (1969) Some remarks on a class of distributive lattices. J Aust Math Soc 9(3–4):289–296
Speed T (1974) Spaces of ideals of distributive lattices \(ii\). minimal prime ideals. J Aust Math Soc 18(1):54–72
Stone MH (1936) The theory of representation for boolean algebras. Trans Am Math Soc 40(1):37–111
Stone MH (1937) Applications of the theory of boolean rings to general topology. Trans Am Math Soc 41(3):375–481
Stone MH (1938) Topological representations of distributive lattices and brouwerian logics. Časopis pro pěstování matematiky a fysiky 67(1):1–25
Strauss DP (1967) Extremally disconnected spaces. Proc Am Math Soc 18(2):305–309
Thakare N, Nimbhorkar S (1983) Space of minimal prime ideals of a ring without nilpotent elements. J Pure Appl Algebra 27(1):75–85
Wraith G (1975) Lectures on elementary topoi. Model Theory T opoi. p. 114
Yang YC (2006) \(\ell \)-groups and Bèzout domains, PhD thesis, University of Stuttgart
Zariski O (1944) The compactness of the riemann manifold of an abstract field of algebraic functions. Bull Am Math Soc 50(10):683–691
Zariski O (1950) The fundamental ideas of abstract algebraic geometry. In: Proceedings of the International Congress of Mathematicians. Cambridge, Mass 2:77–89
Acknowledgements
We would like to give heartfelt thanks to the referees for their very careful reading of the paper and for their very valuable comments and suggestions which improved the paper.
Author information
Authors and Affiliations
Corresponding author
Ethics declarations
Conflict of interest
The authors declare that they have no conflict of interest.
Human and animal rights
This article does not contain any studies with human participants or animals performed by any of the authors.
Additional information
Publisher's Note
Springer Nature remains neutral with regard to jurisdictional claims in published maps and institutional affiliations.
Rights and permissions
About this article
Cite this article
Rasouli, S., Dehghani, A. The hull-kernel topology on prime filters in residuated lattices. Soft Comput 25, 10519–10541 (2021). https://doi.org/10.1007/s00500-021-05985-x
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s00500-021-05985-x