A Banach space with a symmetric basis which contains no ${\ell }_{p}$ or ${c}_{0}$, and all its symmetric basic sequences are equivalent
Compositio Mathematica, Volume 35 (1977) no. 2, p. 189-195
@article{CM_1977__35_2_189_0,
author = {Altshuler, Z.},
title = {A Banach space with a symmetric basis which contains no $\ell \_ p$ or $c\_0$, and all its symmetric basic sequences are equivalent},
journal = {Compositio Mathematica},
publisher = {Noordhoff International Publishing},
volume = {35},
number = {2},
year = {1977},
pages = {189-195},
zbl = {0381.46008},
mrnumber = {458128},
language = {en},
url = {http://www.numdam.org/item/CM_1977__35_2_189_0}
}

Altshuler, Z. A Banach space with a symmetric basis which contains no $\ell _ p$ or $c_0$, and all its symmetric basic sequences are equivalent. Compositio Mathematica, Volume 35 (1977) no. 2, pp. 189-195. http://www.numdam.org/item/CM_1977__35_2_189_0/

[1] Z. Altshuler: Characterization of c0 and lp among Banach spaces with symmetric basis. Israel J. of Math. 24(1) (1976) 39-44. | MR 420228 | Zbl 0333.46009

[2] T. Figiel and W.B. Johnson: A uniformly convex Banach space which contains no lp. Compositio Math. 29(2) (1974) 179-190. | Numdam | MR 355537 | Zbl 0301.46013

[3] W.J. Leveque: Topics in number theory I. Addison-Wesley Publishing Company. | Zbl 0070.03803

[4] B.S. Tsirelson: Not every Banach space contains an imbedding of c0 or lp. Functional analysis and its application 8 (1974) 138-141. | Zbl 0296.46018