ON THE ORDER STRUCTURE OF REPRESENTABLE FUNCTIONALS
Glasgow mathematical journal, Tome 60 (2018) no. 2, pp. 289-305

Voir la notice de l'article provenant de la source Cambridge University Press

The main purpose of this paper is to investigate some natural problems regarding the order structure of representable functionals on *-algebras. We describe the extreme points of order intervals, and give a non-trivial sufficient condition to decide whether or not the infimum of two representable functionals exists. To this aim, we offer a suitable approach to the Lebesgue decomposition theory, which is in complete analogy with the one developed by Ando in the context of positive operators. This tight analogy allows to invoke Ando's results to characterize uniqueness of the decomposition, and solve the infimum problem over certain operator algebras.
TARCSAY, ZSIGMOND; TITKOS, TAMÁS. ON THE ORDER STRUCTURE OF REPRESENTABLE FUNCTIONALS. Glasgow mathematical journal, Tome 60 (2018) no. 2, pp. 289-305. doi: 10.1017/S0017089517000106
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[1] 1. Anderson, W. N. Jr. and Trapp, G. E., The extreme points of a set of positive semidefinite operators, Linear Algebra Appl. 106 (1988), 209–217. Google Scholar | DOI

[2] 2. Ando, T., Lebesgue-type decomposition of positive operators, Acta Sci. Math. (Szeged) 38 (3–4) (1976), 253–260. Google Scholar

[3] 3. Ando, T., Problem of infimum in the positive cone, in Analytic and geometric inequalities and applications, (Rassias, T. M. and Srivastava, H. M., Editors), Math. Appl., vol. 478 (Kluwer Acad. Publ., Dordrecht, 1999), 1–12. Google Scholar | DOI

[4] 4. Eriksson, S. L. and Leutwiler, H., A potential theoretic approach to parallel addition, Math. Ann. 274 (2) (1986), 301–317. Google Scholar

[5] 5. Green, W. L. and Morley, T. D., The extreme points of order intervals of positive operators, Adv. Appl. Math. 15 (3) (1994), 360–370. Google Scholar

[6] 6. Gudder, S., A Radon-Nikodym theorem for *-algebras, Pacific J. Math. 80 (1) (1979), 141–149. Google Scholar | DOI

[7] 7. Gudder, S. and Moreland, T., Infima of Hilbert space effects, Linear Algebra Appl. 286 (1–3) (1999), 1–17. Google Scholar

[8] 8. Hassi, S., Sebestyén, Z. and De Snoo, H., Lebesgue type decompositions for nonnegative forms, J. Funct. Anal. 257 (12) (2009), 3858–3894. Google Scholar

[9] 9. Kadison, R. V. and Ringrose, J. R., Fundamentals of the theory of operator algebras I. (Academic Press, New York, 1983). Google Scholar

[10] 10. Kosaki, H., Lebesgue decomposition of states on a von Neumann algebra, Am. J. Math. 107 (3) (1985), 697–735. Google Scholar

[11] 11. Palmer, T. W., Banach algebras and the general theory of *-algebras II (Cambridge University Press, Cambridge, 2001). Google Scholar

[12] 12. Pekarev, E. L., Shorts of operators and some extremal problems, Acta Sci. Math. (Szeged) 56 (1–2) (1992), 147–163. Google Scholar

[13] 13. Riesz, F., Sur quelques notions fondamentales dans la théorie générale des opérations linéaires, Ann. of Math. 41 (1) (1940), 174–206. Google Scholar

[14] 14. Sakai, S., C*-Algebras and W*-algebras (Springer-Verlag, Berlin-Heidelberg, New York, 1971). Google Scholar

[15] 15. Sebestyén, Z., On representability of linear functionals on *-algebras, Period. Math. Hungar. 15 (3) (1984), 233–239. Google Scholar

[16] 16. Szűcs, Zs., On the Lebesgue decomposition of positive linear functionals, Proc. Am. Math. Soc. 141 (2) (2013), 619–623. Google Scholar

[17] 17. Tarcsay, Zs., Lebesgue decomposition for representable functionals on *-algebras, Glasgow Math. J. 58 (2) (2016), 491–501. Google Scholar | DOI

[18] 18. Tarcsay, Zs., On the parallel sum of positive operators, forms, and functionals, Acta Math. Hungar. 147 (2) (2015), 408–426. Google Scholar

[19] 19. Titkos, T., Ando's theorem for nonnegative forms, Positivity 16 (4) (2012), 619–626. Google Scholar

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