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Transference of measures via disintegration

Published 7 May 2024 in math.FA | (2405.04202v2)

Abstract: Given a compact space $K$ and a Banach space $E$ we study the structure of positive measures on the product space $K\times B_{E*}$ representing functionals on $C(K,E)$, the space of $E$-valued continuous functions on $K$. Using the technique of disintegration we provide an alternative approach to the procedure of transference of measures introduced by Batty (1990). This enables us to substantially strengthen some of his results, to discover a rich order structure on these measures, to identify maximal and minimal elements and to relate them to the classical Choquet order.

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References (19)
  1. Alfsen, E. Compact convex sets and boundary integrals. Springer-Verlag, New York, 1971. Ergebnisse der Mathematik und ihrer Grenzgebiete, Band 57.
  2. Hahn-Banach type theorems for hypolinear functionals. Math. Ann. 209 (1974), 127–151.
  3. Batty, C. J. K. Vector-valued Choquet theory and transference of boundary measures. Proc. London Math. Soc. (3) 60, 3 (1990), 530–548.
  4. Fremlin, D. H. Measure theory. Vol. 3. Torres Fremlin, Colchester, 2004. Measure algebras, Corrected second printing of the 2002 original.
  5. Fremlin, D. H. Measure theory. Vol. 4. Torres Fremlin, Colchester, 2006. Topological measure spaces. Part I, II, Corrected second printing of the 2003 original.
  6. Uniqueness of complex representing measures on the Choquet boundary. J. Functional Analysis 14 (1973), 1–27.
  7. Hensgen, W. A simple proof of Singer’s representation theorem. Proc. Amer. Math. Soc. 124, 10 (1996), 3211–3212.
  8. Hirsberg, B. Représentations intégrales des formes linéaires complexes. C. R. Acad. Sci. Paris Sér. A-B 274 (1972), A1222–A1224.
  9. Hustad, O. A norm preserving complex Choquet theorem. Math. Scand. 29 (1971), 272–278.
  10. Integral representation theory, vol. 35 of de Gruyter Studies in Mathematics. Walter de Gruyter & Co., Berlin, 2010. Applications to convexity, Banach spaces and potential theory.
  11. Michael, E. Continuous selections. I. Ann. of Math. (2) 63 (1956), 361–382.
  12. Phelps, R. R. The Choquet representation in the complex case. Bull. Amer. Math. Soc. 83, 3 (1977), 299–312.
  13. Phelps, R. R. Lectures on Choquet’s theorem, second ed., vol. 1757 of Lecture Notes in Mathematics. Springer-Verlag, Berlin, 2001.
  14. Roth, W. A new concept for a Choquet ordering. J. London Math. Soc. (2) 34, 1 (1986), 81–96.
  15. Roth, W. Choquet theory for vector-valued functions on a locally compact space. J. Convex Anal. 21, 4 (2014), 1141–1164.
  16. Roth, W. Integral representation—Choquet theory for linear operators on function spaces, vol. 74 of De Gruyter Expositions in Mathematics. De Gruyter, Berlin, [2023] ©2023.
  17. Saab, P. The Choquet integral representation in the affine vector-valued case. Aequationes Math. 20, 2-3 (1980), 252–262.
  18. Saab, P. Integral representation by boundary vector measures. Canad. Math. Bull. 25, 2 (1982), 164–168.
  19. A Choquet theorem for general subspaces of vector-valued functions. Math. Proc. Cambridge Philos. Soc. 98, 2 (1985), 323–326.

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