The Tsirelson Space 
					
						
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									(
									p
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				 Has a Unique Unconditional Basis up to Permutation for 
					
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						p
						<
						1

F. Albiac; C. Leránoz

doi:10.1155/2009/780287

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Home > Journals > Abstr. Appl. Anal. > Volume 2009 > Article

2009 The Tsirelson Space

{\mathcal{T}}^{(p)}

Has a Unique Unconditional Basis up to Permutation for

0 \lt p \lt 1

F. Albiac, C. Leránoz

Abstr. Appl. Anal. 2009: 1-6 (2009). DOI: 10.1155/2009/780287

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Abstract

We show that the $p$ -convexified Tsirelson space ${\mathcal{T}}^{(p)}$ for $0 \lt p \lt 1$ and all its complemented subspaces with unconditional basis have unique unconditional basis up to permutation. The techniquesinvolved in the proof are different from the methods that have been used in all the other uniqueness results in the nonlocally convex setting.

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F. Albiac. C. Leránoz. "The Tsirelson Space ${\mathcal{T}}^{(p)}$ Has a Unique Unconditional Basis up to Permutation for $0 \lt p \lt 1$ ." Abstr. Appl. Anal. 2009 1 - 6, 2009. https://doi.org/10.1155/2009/780287