Characterizations of spreading models of $l^1$

Kiriakouli, Persephone. "Characterizations of spreading models of $l^1$." Commentationes Mathematicae Universitatis Carolinae 41.1 (2000): 79-95. <http://eudml.org/doc/248583>.

@article{Kiriakouli2000,
abstract = {Rosenthal in [11] proved that if $(f_\{k\})$ is a uniformly bounded sequence of real-valued functions which has no pointwise converging subsequence then $(f_\{k\})$ has a subsequence which is equivalent to the unit basis of $l^\{1\}$ in the supremum norm. Kechris and Louveau in [6] classified the pointwise convergent sequences of continuous real-valued functions, which are defined on a compact metric space, by the aid of a countable ordinal index “$\gamma $”. In this paper we prove some local analogues of the above Rosenthal ’s theorem (spreading models of $l^\{1\}$) for a uniformly bounded and pointwise convergent sequence $(f_\{k\})$ of continuous real-valued functions on a compact metric space for which there exists a countable ordinal $\xi $ such that $\gamma ((f_\{n_\{k\}\}))> \omega ^\{\xi \}$ for every strictly increasing sequence $(n_\{k\})$ of natural numbers. Also we obtain a characterization of some subclasses of Baire-1 functions by the aid of spreading models of $l^\{1\}$.},
author = {Kiriakouli, Persephone},
journal = {Commentationes Mathematicae Universitatis Carolinae},
keywords = {uniformly bounded sequences of continuous real-valued functions; convergence index; spreading models of $l^\{1\}$; Baire-1 functions; spreading model; pointwise convergent subsequence; unit vector basis of ; generalized Schreier family; convergence index},
language = {eng},
number = {1},
pages = {79-95},
publisher = {Charles University in Prague, Faculty of Mathematics and Physics},
title = {Characterizations of spreading models of $l^1$},
url = {http://eudml.org/doc/248583},
volume = {41},
year = {2000},
}

TY - JOUR
AU - Kiriakouli, Persephone
TI - Characterizations of spreading models of $l^1$
JO - Commentationes Mathematicae Universitatis Carolinae
PY - 2000
PB - Charles University in Prague, Faculty of Mathematics and Physics
VL - 41
IS - 1
SP - 79
EP - 95
AB - Rosenthal in [11] proved that if $(f_{k})$ is a uniformly bounded sequence of real-valued functions which has no pointwise converging subsequence then $(f_{k})$ has a subsequence which is equivalent to the unit basis of $l^{1}$ in the supremum norm. Kechris and Louveau in [6] classified the pointwise convergent sequences of continuous real-valued functions, which are defined on a compact metric space, by the aid of a countable ordinal index “$\gamma $”. In this paper we prove some local analogues of the above Rosenthal ’s theorem (spreading models of $l^{1}$) for a uniformly bounded and pointwise convergent sequence $(f_{k})$ of continuous real-valued functions on a compact metric space for which there exists a countable ordinal $\xi $ such that $\gamma ((f_{n_{k}}))> \omega ^{\xi }$ for every strictly increasing sequence $(n_{k})$ of natural numbers. Also we obtain a characterization of some subclasses of Baire-1 functions by the aid of spreading models of $l^{1}$.
LA - eng
KW - uniformly bounded sequences of continuous real-valued functions; convergence index; spreading models of $l^{1}$; Baire-1 functions; spreading model; pointwise convergent subsequence; unit vector basis of ; generalized Schreier family; convergence index
UR - http://eudml.org/doc/248583
ER -