Abstract
For every p ∈ (1, ∞), an isomorphically polyhedral Banach space E p is constructed which has an unconditional basis and does not embed isomorphically into a C(K) space for any countable and compact metric space K. Moreover, E p admits a quotient isomorphic to ℓ p .
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References
Alspach D.: A quotient of C(ω ω) which is not isomorphic to a subspace of C(α), α < ω 1. Israel J. Math. 35(1–2), 49–60 (1980)
Alspach D., Argyros S.A.: Complexity of weakly null sequences. Dissertationes Math. 321, 1–44 (1992)
Androulakis G.: A subsequence characterization of sequences spanning isomorphically polyhedral Banach spaces. Studia Math. 127, 65–80 (1998)
Argyros S.A., Deliyanni I., Kutzarova D.N., Manoussakis A.: Modified mixed Tsirelson spaces. J. Funct. Anal. 159(1), 43–109 (1998)
Argyros S.A., Felouzis V.: Interpolating hereditarily indecomposable Banach spaces. J. Am. Math. Soc. 13, 243–294 (2000)
Argyros S.A., Mercourakis S., Tsarpalias T.: Convex unconditionality and summability of weakly null sequences. Israel J. Math. 107, 157–193 (1998)
Argyros, S.A., Raikoftsalis, T.: The cofinal property of indecomposable reflexive Banach spaces (preprint)
Bessaga C., Pelczynski A.: Spaces of continuous functions IV. Studia Math. 19, 53–62 (1960)
Casazza P.G., Kalton N.J., Tzafriri L.: Decompositions of Banach lattices into direct sums. Trans. Am. Math. Soc. 304, 771–800 (1987)
Elton J.: Extremely weakly unconditionally convergent series. Israel J. Math. 40, 255–258 (1981)
Fonf V.: A property of Lindenstrauss–Phelps spaces. Funct. Anal. Appl. 13(1), 66–67 (1979)
Fonf V.: Polyhedral Banach spaces. Mat. Zametki 30(4), 627–634 (1981)
Gasparis I., Odell E., Wahl B.: Weakly null sequences in the Banach space C(K), Methods in Banach space theory. London Math. Soc. Lect. Notes Series 337, 97–131 (2006)
Ghoussoub N., Johnson W.B.: Factoring operators through Banach lattices not containing C(0,1). Math. Z. 194, 153–171 (1987)
Hajek P., Zizler V.: Functions locally dependent on finitely many coordinates. RACSAM Rev. R. Acad. Cienc. Exactas Fis. Nat. Ser. A Mat. 100, 147–154 (2006)
Klee V.: Polyhedral sections of convex bodies. Acta Math. 103, 243–267 (1960)
Lewis D.R., Stegall C.: Banach spaces whose duals are isomorphic to ℓ 1(Γ). J. Funct. Anal. 12, 177–187 (1973)
Leung D.H.: Some isomorphically polyhedral Orlicz sequence spaces. Israel J. Math. 87, 117–128 (1994)
Leung D.H.: On c 0-saturated Banach spaces. Illinois J. Math. 39, 15–29 (1995)
Leung D.H.: Symmetric sequence subspaces of C(α). J. London Math. Soc. 59, 1049–1063 (1999)
Lindenstrauss J., Pelczynski A.: Absolutely summing operators in L p -spaces and their applications. Studia Math. 29, 275–326 (1968)
Lindenstrauss J., Phelps R.R.: Extreme point properties of convex bodies in reflexive Banach spaces. Israel J. Math. 6, 39–48 (1968)
Lindenstrauss J., Tzafriri L.: Classical Banach Spaces I. Springer, New York (1977)
Odell E.: On quotients of Banach spaces having shrinking unconditional bases. Illinois J. Math. 36, 681–695 (1992)
Odell E., Tomczak-Jaegermann N., Wagner R.: Proximity to ℓ 1 and distortion in asymptotic ℓ 1 spaces. J. Funct. Anal. 150, 101–145 (1997)
Pelczynski A., Semadeni Z.: Spaces of continuous functions. III. Spaces C(Ω) for Ω without perfect subsets. Studia Math. 18, 211–222 (1959)
Rosenthal, H.P.: A characterization of c 0 and some remarks concerning the Grothendieck property. In: Texas Functional Analysis Seminar 1982-1983 (Austin, TX), pp. 95–108. Longhorn Notes, Univ. Texas Press, Austin, TX (1983)
Rosenthal, H.P.: Some aspects of the subspace structure of infinite-dimensional Banach spaces. In: Approximation theory and functional analysis (College Station, 1990), pp.151–176. Academic Press, Dublin (1991)
Rosenthal, H.P.: The Banach spaces C(K). In: Johnson, W.B., Lindenstrauss, J. (eds.) Handbook of the Geometry of Banach spaces, vol. 2, pp. 1547–1602. North Holland, Amsterdam (2003)
Schreier J.: Ein Gegenbeispiel zur theorie der schwachen konvergenz. Studia Math. 2, 58–62 (1930)
Stegall C.: Banach spaces whose duals contain ℓ 1(Γ) with applications to the study of dual L 1(μ) spaces. Trans. Am. Math. Soc. 176, 463–477 (1973)
Tokarev E.V.: On one question of Lindenstrauss and Phelps. Funct. Anal. Appl. 7, 254 (1973)
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Gasparis, I. New examples of c 0-saturated Banach spaces. Math. Ann. 344, 491–500 (2009). https://doi.org/10.1007/s00208-008-0319-z
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DOI: https://doi.org/10.1007/s00208-008-0319-z