Open Access Open Access  Restricted Access Subscription Access
Open Access Open Access Open Access  Restricted Access Restricted Access Subscription Access

Topological Vector Space Valued Measures on Topological Spaces


Affiliations
1 The University of Iowa, Department of Mathematics, Iowa City, IA, United States
     

   Subscribe/Renew Journal


If X is a compact Hausdorff space space, E is a complete Hausdorff topological vector space and μ : (C(X),ll.ll) → E a linear continuous exhaustive mapping, we rst give a different proof that there is then a unique reqular, L∞-bounded, exhaustive E-valued Borel measure μ on X such that μ(f) = ∫ fdμ, ∀f ∈ C(X). Then we consider X to be a completely regular Hausdorff space and prove the extension of Alexanderov's theorem: X is a completely regular Hausdorff space and μ : Cb(X) → E a linear, continuos, exhaustive mapping and F is the algebra generated by zero-sets in X. Then there exist a unique nitely additive, exhaustive measure ν : F → E such that (i) ν is L∞-bounded i.e. the absolute convex hull of ν(F) (Γ(ν(F))) is bounded in E; (ii) ν is inner regular by zero-sets and outer regular by positive-sets; (iii) ∫ fdν = µ(f), ∀f ∈ Cb(X).

Keywords

Vector Measures, Measure Representation of Linear Operators, Alexandrov's Theorem.
Subscription Login to verify subscription
User
Notifications
Font Size


  • Aliprantis, C. D., Burkinshaw, O., Locally solid Riesz spaces, Academic Press, 1978.
  • Drewnowski, L., Topological rings of sets, continuous set functions, integration, I, II, III Bull. Acad. Polon. Sci. Ser. Math. Astronom. Phys., 20 (1972), 269–286 (I, II), 439–445 (III).
  • Kalton, N. J., Topologies on Riesz groups and its appliction to measure theory, Proc. Lond. Math. Soc. (3) 28 (1974), 253–273.
  • Khurana, Surjit Singh, Topologies on spaces of continuous vector-valued functions, Trans Amer. Math. Soc., 241 (1978), 195–211.
  • Khurana, Surjit Singh, Extension and regularity of Group-Valued Baire Measures, Bull. Acad. Polon. Sci. Ser. Sci. Math. Astronom. Phys. 22 (1974), 891–895.
  • Wright, J. D. Maitland, The measure extension problem for vector lattics, Annales de l’institute Fourier, tome 21, No. 4 (1971), 65–85
  • Schaeffer, H. H., Topological Vector spaces, Springer Verlag (1986).
  • Sentilles, F. D., Bounded continuous functions on completely regular spaces, Trans. Amer. Math. Soc., 168 (1972), 311–336.
  • Thomas, E., Vector Integration, Quaestiones Mathematicae, 35 (2012), 391–416.
  • Wheeler, R. F., Survey of Baire measures and strict topologies, Expos. Math., 2 (1983), 97–190.
  • Turpin, Ph., Convexite dans les espaces vectoriels topologiques generaux, Diss. Math. 131, Institute of Mathematics, Polish Academy of Sciences, Warsaw, (1976).
  • Turpin, Ph., Integration par rapport a’ une mesurea valeurs dans un espace vectoriel topologique non suppose localement convexe Integration vectorielle et multivoque: actes du Colloque [d’]Integration vectorielle et multivoque (Caen, 22 et 23 Mai 1975), (1975), No. 8, 22 pp.
  • Varadarajan, V. S., Measures on topological spaces, Amer. Math. Soc. Transl. (2) 48 (1965), 161–228.

Abstract Views: 534

PDF Views: 4




  • Topological Vector Space Valued Measures on Topological Spaces

Abstract Views: 534  |  PDF Views: 4

Authors

Surjit Singh Khurana
The University of Iowa, Department of Mathematics, Iowa City, IA, United States

Abstract


If X is a compact Hausdorff space space, E is a complete Hausdorff topological vector space and μ : (C(X),ll.ll) → E a linear continuous exhaustive mapping, we rst give a different proof that there is then a unique reqular, L∞-bounded, exhaustive E-valued Borel measure μ on X such that μ(f) = ∫ fdμ, ∀f ∈ C(X). Then we consider X to be a completely regular Hausdorff space and prove the extension of Alexanderov's theorem: X is a completely regular Hausdorff space and μ : Cb(X) → E a linear, continuos, exhaustive mapping and F is the algebra generated by zero-sets in X. Then there exist a unique nitely additive, exhaustive measure ν : F → E such that (i) ν is L∞-bounded i.e. the absolute convex hull of ν(F) (Γ(ν(F))) is bounded in E; (ii) ν is inner regular by zero-sets and outer regular by positive-sets; (iii) ∫ fdν = µ(f), ∀f ∈ Cb(X).

Keywords


Vector Measures, Measure Representation of Linear Operators, Alexandrov's Theorem.

References





DOI: https://doi.org/10.18311/jims%2F2019%2F21590