<p>The development of a substantial body of work on the subject of uniqueness of unconditional structure in Banach and <i>p</i>-Banach spaces sprang from the 1985 celebrated Memoir [12] by Bourgain et al., where the authors aimed at classifying all Banach spaces with that property. One of the most striking results from that paper was that the 2-convexified Tsirelson space, <InlineEquation ID="IEq1"> <EquationSource Format="TEX">\({\cal{T}}^{(2)}\)</EquationSource> <EquationSource Format="MATHML"><math display="block"> <msup> <mrow> <mrow> <mi mathvariant="script">T</mi> </mrow> </mrow> <mrow> <mo stretchy="false">(</mo> <mn>2</mn> <mo stretchy="false">)</mo> </mrow> </msup> </math></EquationSource> </InlineEquation>, had a unique unconditional basis (up to equivalence and permutation). Forty years later, many of the questions raised in the Memoir remain open but there has been a considerable effort in advancing a topic that had received relatively little attention until then. Continuing in the spirit of the program set in the Memoir, in this note we show that the direct sum of infinitely many copies of <InlineEquation ID="IEq2"> <EquationSource Format="TEX">\({\cal{T}}^{(2)}\)</EquationSource> <EquationSource Format="MATHML"><math display="block"> <msup> <mrow> <mrow> <mi mathvariant="script">T</mi> </mrow> </mrow> <mrow> <mo stretchy="false">(</mo> <mn>2</mn> <mo stretchy="false">)</mo> </mrow> </msup> </math></EquationSource> </InlineEquation> for 0 &lt; <i>p</i> &lt; 1, denoted <InlineEquation ID="IEq3"> <EquationSource Format="TEX">\(\ell_{p}({\cal{T}}^{(2)})\)</EquationSource> <EquationSource Format="MATHML"><math display="block"> <msub> <mi>ℓ</mi> <mrow> <mi>p</mi> </mrow> </msub> <mo stretchy="false">(</mo> <msup> <mrow> <mrow> <mi mathvariant="script">T</mi> </mrow> </mrow> <mrow> <mo stretchy="false">(</mo> <mn>2</mn> <mo stretchy="false">)</mo> </mrow> </msup> <mo stretchy="false">)</mo> </math></EquationSource> </InlineEquation>, has a unique unconditional basis, and that the same property holds for <InlineEquation ID="IEq4"> <EquationSource Format="TEX">\(\ell_{p}(({\cal{T}}^{(2)})^{*})\)</EquationSource> <EquationSource Format="MATHML"><math display="block"> <msub> <mi>ℓ</mi> <mrow> <mi>p</mi> </mrow> </msub> <mo stretchy="false">(</mo> <mo stretchy="false">(</mo> <msup> <mrow> <mrow> <mi mathvariant="script">T</mi> </mrow> </mrow> <mrow> <mo stretchy="false">(</mo> <mn>2</mn> <mo stretchy="false">)</mo> </mrow> </msup> <msup> <mo stretchy="false">)</mo> <mrow> <mo>∗</mo> </mrow> </msup> <mo stretchy="false">)</mo> </math></EquationSource> </InlineEquation>. Our results and methods are relevant in applications since they permit us to reprove the uniqueness of the (discrete) lattice structure induced by an unconditional basis in other spaces.</p>

错误:搜索内容不能为空,请输入英文关键词
错误:关键词超出字数限制,请精简
高级检索

Uniqueness of unconditional basis of infinite direct sums of the 2-convexified Tsirelson space and its dual

  • Fernando Albiac,
  • José L. Ansorena

摘要

The development of a substantial body of work on the subject of uniqueness of unconditional structure in Banach and p-Banach spaces sprang from the 1985 celebrated Memoir [12] by Bourgain et al., where the authors aimed at classifying all Banach spaces with that property. One of the most striking results from that paper was that the 2-convexified Tsirelson space, \({\cal{T}}^{(2)}\) T ( 2 ) , had a unique unconditional basis (up to equivalence and permutation). Forty years later, many of the questions raised in the Memoir remain open but there has been a considerable effort in advancing a topic that had received relatively little attention until then. Continuing in the spirit of the program set in the Memoir, in this note we show that the direct sum of infinitely many copies of \({\cal{T}}^{(2)}\) T ( 2 ) for 0 < p < 1, denoted \(\ell_{p}({\cal{T}}^{(2)})\) p ( T ( 2 ) ) , has a unique unconditional basis, and that the same property holds for \(\ell_{p}(({\cal{T}}^{(2)})^{*})\) p ( ( T ( 2 ) ) ) . Our results and methods are relevant in applications since they permit us to reprove the uniqueness of the (discrete) lattice structure induced by an unconditional basis in other spaces.