Factorization of operators throughL _p∞ orL _p1 and non-commutative generalizations

1. Bergh, J., Löfström, J.: Interpolation spaces. An introduction. Berlin, Heidelberg, New York: Springer 1976

   Google Scholar 

2. Dubinski, E., Pełczyński, A., Rosenthal, H.P.: On Banach spacesX for which Π₂(ℒ_∞,X) =B(ℒ_∞,X). Stud. Math.44, 617–648 (1972)

   Google Scholar 

3. Fack, T.: Type and cotype inequalities for non-commutativeL ^p-spaces. (1985) Preprint n^o 67. Publ. Math. Uni. Pierre Marie Curie 1-30

4. Figiel, T.: On the moduli of convexity and smoothness. Stud. Math.61, 121–155 (1976)

   Google Scholar 

5. Figiel, T., Johnson, W.B.: A uniformly convex space which contains nol _p. Comp. Math.29, 179–190 (1974)

   Google Scholar 

6. Friedman, Y.: Subspace ofLC(H) andC _p. Proc. AMS53, 117–122 (1975)

   Google Scholar 

7. Grothendieck, A.: Sur les applications linéaires faiblement compactes d'espaces du typeC(K). Can. J. Math.5, 129–173 (1953)

   Google Scholar 

8. Guerre, S., Levy M.: Espacesl ^p dans les sous-espaces deL ¹. Trans. Am. Math. Soc.279, 611–616 (1983)

   Google Scholar 

9. Haagerup, U.: The Grothendieck inequality for bilinear forms onC ^*-algebras. Adv. Math.56, 93–116 (1985)

   Google Scholar 

10. Haagerup, U.:L ^p-spaces associated with an arbitrary von Neumann algebra. Colloq. Int. C.N.R.S.274, 175–184 (1977)

    Google Scholar 

11. Hunt, R.A.: OnL(p, q) spaces. Enseign. Math.12, 249–274 (1966)

    Google Scholar 

12. James, R.C.: Some self dual properties of normed linear spaces. Ann. Math. Stud.69 (1972)

13. Jarchow, H.: Weakly compact operators onC ^*-algebras. Math. Ann.273, 341–343 (1986)

    Google Scholar 

14. Kadec, M.I., Pełczyński, A.: Bases, lacunary sequences and complemented subspaces in the spacesL _p. Stud. Math.21, 161–176 (1962)

    Google Scholar 

15. Kaijser, S.: A simple minded proof of the Pisier-Grothendieck inequality. In: Proceedings University of Connecticut 80/81. Lect. Notes Math. 995, pp. 33–55. Berlin, Heidelberg, New York: Springer 1983

    Google Scholar 

16. Kisliakov, S.V.: On spaces with “small” annihilators. Zap. Nauchn. Semin. Leningr. Otd. Mat. Inst. Steklova (LOMI)65, 192–195 (1976)

    Google Scholar 

17. Kosaki, H.: Applications of the complex interpolation method to a von Neumann algebra: non commutativeL ^p-spaces. J. Funct. Anal.56, 29–78 (1984)

    Google Scholar 

18. Kwapień, S.: On a theorem of L. Schwartz and its applications to absolutely summing operators. Stud. Math.38, 193–200 (1970)

    Google Scholar 

19. Lions, J.L., Peetre, J.: Sur une classe d'espaces d'interpolation. Publ. Math. IHES19, 5–68 (1964)

    Google Scholar 

20. Lust-Picard, F.: Inégalités de Khintchine dansC _p (1<p<∞). C.R. Acad. Sci. Paris A303, 289–292 (1986)

    Google Scholar 

21. Lindenstrauss, J., Tzafriri, L.: Classical Banach spaces, Vol. II. Function spaces. Berlin, Heidelberg, New York: Springer 1979

    Google Scholar 

22. Maurey, B.: Nouveaux théorèmes de Nikishin. Séminaire Maurey-Schwartz 73–74. Exposés n^o 4 et 5. Ecole Polytechnique. Paris

23. Maurey, B.: Théorèmes de factorisation pour les opérateurs à valeurs dans les espacesL _p. Astérisque11, 1–150 (1974)

    Google Scholar 

24. Maurey, B.: Sur certaines propriétés des opérateurs sommants. C.R. Acad. Sci. Paris A277, 1053–1055 (1973)

    Google Scholar 

25. Maurey, B.: Type et cotype dans les espaces munis de structure locale inconditionnelle. Séminaire Maurey-Schwartz 73–74. Exposé n^o 24–25. Ecole Polytechnique. Paris

26. Maurey, B.: Un théorème de prolongement. C.R. Acad. Sci. Paris A279, 329–332 (1974)

    Google Scholar 

27. Maurey, B., Pisier, G.: Séries de variables aléatoires vectorielles indépendantes et propriétés géométriques des espaces de Banach. Stud. Math.58, 45–90 (1976)

    Google Scholar 

28. Mezrag, L.: Théorèmes de factorisation et de prolongement pour les opérateurs à valeurs dans les espacesL ^p, pourp<1. C.R. Acad. Sci. Paris A300, 299–302 (1985)

    Google Scholar 

29. Nikisin, E.M.: Resonance theorems and superlinear operators. Translations of contents of Uspekhi Mat. Nauk vol. XXV n^o 6 Nov.–Déc. 1970

30. Pietsch, A.: Operator ideals. Amsterdam: North-Holland 1978

    Google Scholar 

31. Pisier, G.: Grothendieck's theorem for non-commutativeC ^*-algebras with an appendix on Grothendieck's constants. J. Funct. Anal.29, 397–415 (1978)

    Google Scholar 

32. Pisier, G.: Factorization of linear operators and Geometry of Banach spaces. Am. Math. Soc. CBMS60, 1–154 (1986)

    Google Scholar 

33. Pisier, G.: Factorisation des opérateurs (q, p)-sommants sur lesC ^*-algèbres. C.R. Acad. Sci. Paris A301, 403–405 (1985)

    Google Scholar 

34. Pisier, G.: Some applications of the complex interpolation method to Banach lattices. J. Anal. Math. Jerusalem35, 264–281 (1979)

    Google Scholar 

35. Pisier G.: Topics on Grothendieck's theorem. Proceedings International Conference on Operator algebras, operator ideals and Theoretical Physics. (Leipzig, September 1977). Teubner Text in Math. 44–57 (1978)

36. Rosenthal, H.P.: On subspaces ofL _p. Ann. Math.97, 344–373 (1973)

    Google Scholar 

37. Sakai, S.:C ^*-algebras andW ^*-algebras. Berlin, Heidelberg, New York: Springer 1979

    Google Scholar 

38. Takesaki, M.: Theory of operator algebras. I. Berlin, Heidelberg, New York: Springer 1979

    Google Scholar 

39. Tomczak-Jaegermann, N.: On the moduli of smoothness and convexity and the Rademacher averages of the trace classesS _p(1≦p<∞). Stud. Math.50, 163–182 (1974)

    Google Scholar 

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