Sequences of 0's and 1's: new results via double sequence spaces

This paper continues the joint investigation by Bennett et al. (2001) of the extent to which sequence spaces are determined by the sequences of 0's and 1's that they contain. The first main result gives a negative answer to Question 6 in their paper: There exists a sequence space E such th...

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Bibliographic Details
Published in:Journal of mathematical analysis and applications 2002-11, Vol.275 (2), p.883-899
Main Authors: Zeltser, Maria, Boos, Johann, Leiger, Toivo
Format: Article
Language:English
Subjects:
Dense subspaces of ℓ
Double sequence spaces
Exact sciences and technology
Functional analysis
Hahn property
Inclusion theorems
Mathematical analysis
Mathematics
Matrix Hahn property
Schur's theorem
Sciences and techniques of general use
Separable Hahn property
Sequences of zeros and ones
Sequences, series, summability
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Summary:This paper continues the joint investigation by Bennett et al. (2001) of the extent to which sequence spaces are determined by the sequences of 0's and 1's that they contain. The first main result gives a negative answer to Question 6 in their paper: There exists a sequence space E such that each matrix domain containing all of the sequences of zeros and ones in E contains all of E, but such that this statement fails, if we replace matrix domains by separable FK-spaces. The second main result goes on from Hahn's theorem that tells us that each matrix domain including χ, the set of all sequences of 0's and 1's, contains all of the bounded sequences: It is shown that there exists a really ‘small’ subset χ of χ such that Hahn's theorem remains true when χ is replaced with it. The proofs of both results have in common that, by identifying sequence spaces and double sequence spaces, the constructions and the required investigations are done in double sequence spaces that allow the description of finer structures.
ISSN:0022-247X
1096-0813
DOI:10.1016/S0022-247X(02)00444-4