Home Mathematics Extension of measures on pseudo-D-lattices
Article
Licensed
Unlicensed Requires Authentication

Extension of measures on pseudo-D-lattices

  • Anna Avallone EMAIL logo , Anna De Simone and Paolo Vitolo
Published/Copyright: July 5, 2016
Become an author with De Gruyter Brill
Author Information Explore this Subject
Mathematica Slovaca
From the journal Mathematica Slovaca Volume 66 Issue 2

Abstract

We prove a Carathéodory type extension theorem for σ-additive exhaustive modular measures on σ-continuous pseudo-D-lattices.

MSC 2010: Primary 28B05; 06C15
Keywords: modular measures; pseudo-D-lattices; Carathéodory extension

Dedicated to Prof. A. Dvurečenskij on the occasion of his birthday (Communicated by Sylvia Pulmannová)

References

[Al] ALFSEN, E. M.: Order theoretical foundations of integration, Math. Ann. 149 (1963), 419–461.10.1007/BF01397977Search in Google Scholar

[A-B-V] AVALLONE, A.—BARBIERI, G.—VITOLO, P.: Central elements in pseudo-D-lattices and Hahn decomposition theorem, Boll. Unione Mat. Ital. (9) 3 (2010), 447–470.Search in Google Scholar

[A-D-V] AVALLONE, A.—DE SIMONE, A.—VITOLO, P.: Effect algebras and extensions of measures, Boll. Unione Mat. Ital. Sez. B Artic. Ric. Mat. (8) 9 (2006), 423–444.Search in Google Scholar

[A-V1] AVALLONE, A.—VITOLO, P.: Lattice uniformities on pseudo-D-lattices, Math. Slovaca 62, (2012), 1–26.10.2478/s12175-012-0062-5Search in Google Scholar

[A-V2] AVALLONE, A.—BARBIERI, G.—VITOLO, P.: Pseudo-D-lattices and Lyapunov measures, Rend. Circ. Mat. Palermo (2) 62 (2013), 301–314.10.1007/s12215-013-0126-6Search in Google Scholar

[A-V3] AVALLONE, A.—VITOLO, P.: Pseudo-D-lattices and topologies generated by measures, Ital. J. Pure Appl. Math. 29 (2012), 25–42.Search in Google Scholar

[A-V4] AVALLONE, A.—VITOLO, P.: Lebesgue decomposition and Bartle-Dunford-Schwartz theorem in pseudo-D-lattices, Acta Math. Sci. Ser. B Engl. Ed. 33 (2013), No. 3, 1–25.10.1016/S0252-9602(13)60028-4Search in Google Scholar

[Ba-W] BARBIERI, G.—WEBER, H.: A topological approach to the study of fuzzy measures. In: Functional Analysis and Economic Theory, Springer, Berlin, 1998. pp. 17–46.10.1007/978-3-642-72222-6_3Search in Google Scholar

[Bel-C] BELTRAMETTI, E. G.—CASSINELLI, G.: The logic of Quantum Mechanics, Addison-Wesley Publishing Co., Reading, MA, 1981.Search in Google Scholar

[Ben-F] BENNET, M. K.—FOULIS, D. J.: Effect algebras and unsharp quantum logics, Found. Phys. 24 (1994), 1331–1352.10.1007/BF02283036Search in Google Scholar

[Bu-K] BUTNARIU, D—KLEMENT, P.: Triangular Norm-Based Measures and Games with Fuzzy Coalitions, Kluwer Acad. Publ., Dordrecht, 1993.10.1007/978-94-017-3602-2Search in Google Scholar

[Di-U] DIESTEL, J.—UHL, J. J.: Vector Measures, Amer. Math. Soc., Providence, RI, 1977.10.1090/surv/015Search in Google Scholar

[Dv-V] DVUREČENSKIJ, A—VETTERLEIN, T.: Pseudoeffect algebras. I. Basic properties, Internat. J. Theoret. Phys. 40 (2001), 685–701.10.1023/A:1004192715509Search in Google Scholar

[E-Z] EPSTEIN, L. G.—ZHANG, J.: Subjective probabilities on subjectively unambiguous events, Econometrica 69 (2001), 265–306.10.1111/1468-0262.00193Search in Google Scholar

[F-T] FLEISCHER, I.—TRAYNOR, T.: Equivalence of group-valued measure on an abstract lattice, Bull. Pol. Acad. Sci. Math. 28 (1980), 549–556.Search in Google Scholar

[Ge-I] GEORGESCU, G.—IORGULESCU, A.: Pseudo-MV algebras, Mult.-Valued Logic 6 (2001), 95–135.Search in Google Scholar

[Gh-M] GHIRARDATO, P.—MARINACCI, M.: Ambiguity made precise: a comparative foundation, J. Econom. Theory 102 (2002), 251–289.10.4324/9780203358061_chapter_10Search in Google Scholar

[W1] WEBER, H.: Uniform Lattices I; Uniform lattices II, Ann. Mat. Pura Appl. 160; 165 (1991; 1993), 347–370; 133–158.10.1007/BF01765846Search in Google Scholar

[W2] WEBER, H.: On modular functions, Funct. Approx. Comment. Math. 24 (1996), 35–52.Search in Google Scholar

[W3] WEBER, H.: Uniform lattices and modular functions, Atti Semin. Mat. Fis. Univ. Modena Reggio Emilia 47 (1999), 159–182.Search in Google Scholar

[Y-Y-M] YUN, S.—YONGMING, L.—MAOYIN, C.: Pseudo difference posets and pseudo Boolean D-posets, Internat. J. Theoret. Phys. 43 (2004), 2447–2460.10.1007/s10773-004-7710-7Search in Google Scholar

[Z] ZHANG, J.: Qualitative probabilities and λ-systems, Math. Social Sci. 38 (1999), 11–20.10.1016/S0165-4896(98)00035-3Search in Google Scholar

Received: 2014-2-12
Accepted: 2014-7-8
Published Online: 2016-7-5
Published in Print: 2016-4-1

© 2016 Mathematical Institute Slovak Academy of Sciences

Articles in the same Issue

  1. Research Article
  2. Holistic logical arguments in quantum computation
  3. Research Article
  4. States with values in the Łukasiewicz groupoid
  5. Research Article
  6. On realization of effect algebras
  7. Research Article
  8. States on symmetric logics: extensions
  9. Research Article
  10. Extensions and measurability in quantum measure spaces
  11. Research Article
  12. Convex subalgebras of upper bounded GMV-algebras
  13. Research Article
  14. Combining boolean algebras and -groups in the variety generated by chang’s mv-algebra
  15. Research Article
  16. Large rigid sets of algebras with respect to embeddability
  17. Research Article
  18. Conformal algebras, vertex algebras, and the logic of locality
  19. Research Article
  20. Extension of measures on pseudo-D-lattices
  21. Research Article
  22. Note on a parameter switching method for nonlinear ODEs
  23. Research Article
  24. Compatibility for probabilistic theories
  25. Research Article
  26. Completeness of Gelfand-Neumark-Segal inner product space on Jordan algebras
  27. Research Article
  28. Commutativity in a synaptic algebra
  29. Research Article
  30. Discrete averaged mixing applied to the logarithmic distributions
  31. Research Article
  32. Automorphisms of decompositions
https://doi.org/10.1515/ms-2015-0147
Keywords for this article
modular measures; pseudo-D-lattices; Carathéodory extension

Articles in the same Issue

  1. Research Article
  2. Holistic logical arguments in quantum computation
  3. Research Article
  4. States with values in the Łukasiewicz groupoid
  5. Research Article
  6. On realization of effect algebras
  7. Research Article
  8. States on symmetric logics: extensions
  9. Research Article
  10. Extensions and measurability in quantum measure spaces
  11. Research Article
  12. Convex subalgebras of upper bounded GMV-algebras
  13. Research Article
  14. Combining boolean algebras and -groups in the variety generated by chang’s mv-algebra
  15. Research Article
  16. Large rigid sets of algebras with respect to embeddability
  17. Research Article
  18. Conformal algebras, vertex algebras, and the logic of locality
  19. Research Article
  20. Extension of measures on pseudo-D-lattices
  21. Research Article
  22. Note on a parameter switching method for nonlinear ODEs
  23. Research Article
  24. Compatibility for probabilistic theories
  25. Research Article
  26. Completeness of Gelfand-Neumark-Segal inner product space on Jordan algebras
  27. Research Article
  28. Commutativity in a synaptic algebra
  29. Research Article
  30. Discrete averaged mixing applied to the logarithmic distributions
  31. Research Article
  32. Automorphisms of decompositions
Sign up now to receive a 20% welcome discount
Institutional Access
How does access work?
Have an idea on how to improve our website?
Please write us.
© 2026 De Gruyter Brill
Downloaded on 26.2.2026 from https://www.degruyterbrill.com/document/doi/10.1515/ms-2015-0147/html
Scroll to top button