{"title":"Representations of groups on Banach spaces","authors":"Stefano Ferri, Camilo Gómez, Matthias Neufang","doi":"10.1090/proc/16499","DOIUrl":null,"url":null,"abstract":"<p>We establish a general framework for representability of a metric group on a (well-behaved) class of Banach spaces. More precisely, let <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper G\"> <mml:semantics> <mml:mrow> <mml:mi mathvariant=\"script\">G</mml:mi> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathcal {G}</mml:annotation> </mml:semantics> </mml:math> </inline-formula> be a topological group, and <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper A\"> <mml:semantics> <mml:mrow> <mml:mi mathvariant=\"script\">A</mml:mi> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathcal {A}</mml:annotation> </mml:semantics> </mml:math> </inline-formula> a unital symmetric <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"upper C Superscript asterisk\"> <mml:semantics> <mml:msup> <mml:mi>C</mml:mi> <mml:mo>∗<!-- ∗ --></mml:mo> </mml:msup> <mml:annotation encoding=\"application/x-tex\">C^*</mml:annotation> </mml:semantics> </mml:math> </inline-formula>-subalgebra of <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"normal upper U normal upper C left-parenthesis script upper G right-parenthesis\"> <mml:semantics> <mml:mrow> <mml:mrow> <mml:mi mathvariant=\"normal\">U</mml:mi> <mml:mi mathvariant=\"normal\">C</mml:mi> </mml:mrow> <mml:mo stretchy=\"false\">(</mml:mo> <mml:mrow> <mml:mi mathvariant=\"script\">G</mml:mi> </mml:mrow> <mml:mo stretchy=\"false\">)</mml:mo> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathrm {UC}(\\mathcal {G})</mml:annotation> </mml:semantics> </mml:math> </inline-formula>, the algebra of bounded uniformly continuous functions on <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper G\"> <mml:semantics> <mml:mrow> <mml:mi mathvariant=\"script\">G</mml:mi> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathcal {G}</mml:annotation> </mml:semantics> </mml:math> </inline-formula>. Generalizing the notion of a stable metric, we study <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper A\"> <mml:semantics> <mml:mrow> <mml:mi mathvariant=\"script\">A</mml:mi> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathcal {A}</mml:annotation> </mml:semantics> </mml:math> </inline-formula>-metrics <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"delta\"> <mml:semantics> <mml:mi>δ<!-- δ --></mml:mi> <mml:annotation encoding=\"application/x-tex\">\\delta</mml:annotation> </mml:semantics> </mml:math> </inline-formula>, i.e., the function <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"delta left-parenthesis e comma dot right-parenthesis\"> <mml:semantics> <mml:mrow> <mml:mi>δ<!-- δ --></mml:mi> <mml:mo stretchy=\"false\">(</mml:mo> <mml:mi>e</mml:mi> <mml:mo>,</mml:mo> <mml:mo>⋅<!-- ⋅ --></mml:mo> <mml:mo stretchy=\"false\">)</mml:mo> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\delta (e, \\cdot )</mml:annotation> </mml:semantics> </mml:math> </inline-formula> belongs to <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper A\"> <mml:semantics> <mml:mrow> <mml:mi mathvariant=\"script\">A</mml:mi> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathcal {A}</mml:annotation> </mml:semantics> </mml:math> </inline-formula>; the case <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper A equals upper W upper A upper P left-parenthesis script upper G right-parenthesis\"> <mml:semantics> <mml:mrow> <mml:mrow> <mml:mi mathvariant=\"script\">A</mml:mi> </mml:mrow> <mml:mo>=</mml:mo> <mml:mi>W</mml:mi> <mml:mspace width=\"-0.7mm\" /> <mml:mi>A</mml:mi> <mml:mspace width=\"-0.2mm\" /> <mml:mi>P</mml:mi> <mml:mo stretchy=\"false\">(</mml:mo> <mml:mrow> <mml:mi mathvariant=\"script\">G</mml:mi> </mml:mrow> <mml:mo stretchy=\"false\">)</mml:mo> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathcal {A}=W\\hskip -0.7mm A\\hskip -0.2mm P(\\mathcal {G})</mml:annotation> </mml:semantics> </mml:math> </inline-formula>, the algebra of weakly almost periodic functions on <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper G\"> <mml:semantics> <mml:mrow> <mml:mi mathvariant=\"script\">G</mml:mi> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathcal {G}</mml:annotation> </mml:semantics> </mml:math> </inline-formula>, recovers stability. If the topology of <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"upper G\"> <mml:semantics> <mml:mi>G</mml:mi> <mml:annotation encoding=\"application/x-tex\">G</mml:annotation> </mml:semantics> </mml:math> </inline-formula> is induced by a left invariant metric <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"d\"> <mml:semantics> <mml:mi>d</mml:mi> <mml:annotation encoding=\"application/x-tex\">d</mml:annotation> </mml:semantics> </mml:math> </inline-formula>, we prove that <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper A\"> <mml:semantics> <mml:mrow> <mml:mi mathvariant=\"script\">A</mml:mi> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathcal {A}</mml:annotation> </mml:semantics> </mml:math> </inline-formula> determines the topology of <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper G\"> <mml:semantics> <mml:mrow> <mml:mi mathvariant=\"script\">G</mml:mi> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathcal {G}</mml:annotation> </mml:semantics> </mml:math> </inline-formula> if and only if <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"d\"> <mml:semantics> <mml:mi>d</mml:mi> <mml:annotation encoding=\"application/x-tex\">d</mml:annotation> </mml:semantics> </mml:math> </inline-formula> is uniformly equivalent to a left invariant <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper A\"> <mml:semantics> <mml:mrow> <mml:mi mathvariant=\"script\">A</mml:mi> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathcal {A}</mml:annotation> </mml:semantics> </mml:math> </inline-formula>-metric. As an application, we show that the additive group of <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"upper C left-bracket 0 comma 1 right-bracket\"> <mml:semantics> <mml:mrow> <mml:mi>C</mml:mi> <mml:mo stretchy=\"false\">[</mml:mo> <mml:mn>0</mml:mn> <mml:mo>,</mml:mo> <mml:mn>1</mml:mn> <mml:mo stretchy=\"false\">]</mml:mo> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">C[0,1]</mml:annotation> </mml:semantics> </mml:math> </inline-formula> is not reflexively representable; this is a new proof of Megrelishvili [<italic>Topological transformation groups: selected topics</italic>, Elsevier, 2007, Question 6.7] (the problem was already solved by Ferri and Galindo [Studia Math. 193 (2009), pp. 99–108] with different methods and later the results were generalized by Yaacov, Berenstein, and Ferri [Math. Z. 267 (2011), pp.129–138]). Let now <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper G\"> <mml:semantics> <mml:mrow> <mml:mi mathvariant=\"script\">G</mml:mi> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathcal {G}</mml:annotation> </mml:semantics> </mml:math> </inline-formula> be a metric group, and assume <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper A subset-of-or-equal-to normal upper L normal upper U normal upper C left-parenthesis script upper G right-parenthesis\"> <mml:semantics> <mml:mrow> <mml:mrow> <mml:mi mathvariant=\"script\">A</mml:mi> </mml:mrow> <mml:mo>⊆<!-- ⊆ --></mml:mo> <mml:mrow> <mml:mi mathvariant=\"normal\">L</mml:mi> <mml:mi mathvariant=\"normal\">U</mml:mi> <mml:mi mathvariant=\"normal\">C</mml:mi> </mml:mrow> <mml:mo stretchy=\"false\">(</mml:mo> <mml:mrow> <mml:mi mathvariant=\"script\">G</mml:mi> </mml:mrow> <mml:mo stretchy=\"false\">)</mml:mo> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathcal {A}\\subseteq \\mathrm {LUC}(\\mathcal {G})</mml:annotation> </mml:semantics> </mml:math> </inline-formula>, the algebra of bounded left uniformly continuous functions on <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper G\"> <mml:semantics> <mml:mrow> <mml:mi mathvariant=\"script\">G</mml:mi> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathcal {G}</mml:annotation> </mml:semantics> </mml:math> </inline-formula>, is a unital <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"upper C Superscript asterisk\"> <mml:semantics> <mml:msup> <mml:mi>C</mml:mi> <mml:mo>∗<!-- ∗ --></mml:mo> </mml:msup> <mml:annotation encoding=\"application/x-tex\">C^*</mml:annotation> </mml:semantics> </mml:math> </inline-formula>-algebra which is the uniform closure of coefficients of representations of <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper G\"> <mml:semantics> <mml:mrow> <mml:mi mathvariant=\"script\">G</mml:mi> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathcal {G}</mml:annotation> </mml:semantics> </mml:math> </inline-formula> on members of <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper F\"> <mml:semantics> <mml:mrow> <mml:mi mathvariant=\"script\">F</mml:mi> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathscr {F}</mml:annotation> </mml:semantics> </mml:math> </inline-formula>, where <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper F\"> <mml:semantics> <mml:mrow> <mml:mi mathvariant=\"script\">F</mml:mi> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathscr {F}</mml:annotation> </mml:semantics> </mml:math> </inline-formula> is a class of Banach spaces closed under <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script l 2\"> <mml:semantics> <mml:msub> <mml:mi>ℓ<!-- ℓ --></mml:mi> <mml:mn>2</mml:mn> </mml:msub> <mml:annotation encoding=\"application/x-tex\">\\ell _2</mml:annotation> </mml:semantics> </mml:math> </inline-formula>-direct sums. We prove that <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper A\"> <mml:semantics> <mml:mrow> <mml:mi mathvariant=\"script\">A</mml:mi> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathcal {A}</mml:annotation> </mml:semantics> </mml:math> </inline-formula> determines the topology of <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper G\"> <mml:semantics> <mml:mrow> <mml:mi mathvariant=\"script\">G</mml:mi> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathcal {G}</mml:annotation> </mml:semantics> </mml:math> </inline-formula> if and only if <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper G\"> <mml:semantics> <mml:mrow> <mml:mi mathvariant=\"script\">G</mml:mi> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathcal {G}</mml:annotation> </mml:semantics> </mml:math> </inline-formula> embeds into the isometry group of a member of <inline-formula content-type=\"math/mathml\"> <mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper F\"> <mml:semantics> <mml:mrow> <mml:mi mathvariant=\"script\">F</mml:mi> </mml:mrow> <mml:annotation encoding=\"application/x-tex\">\\mathscr {F}</mml:annotation> </mml:semantics> </mml:math> </inline-formula>, equipped with the weak operator topology. As applications, we obtain characterizations of unitary and reflexive representability.</p>","PeriodicalId":20696,"journal":{"name":"Proceedings of the American Mathematical Society","volume":null,"pages":null},"PeriodicalIF":0.8000,"publicationDate":"2024-03-29","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Proceedings of the American Mathematical Society","FirstCategoryId":"100","ListUrlMain":"https://doi.org/10.1090/proc/16499","RegionNum":3,"RegionCategory":"数学","ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q2","JCRName":"MATHEMATICS","Score":null,"Total":0}
引用次数: 0
Abstract
We establish a general framework for representability of a metric group on a (well-behaved) class of Banach spaces. More precisely, let G\mathcal {G} be a topological group, and A\mathcal {A} a unital symmetric C∗C^*-subalgebra of UC(G)\mathrm {UC}(\mathcal {G}), the algebra of bounded uniformly continuous functions on G\mathcal {G}. Generalizing the notion of a stable metric, we study A\mathcal {A}-metrics δ\delta, i.e., the function δ(e,⋅)\delta (e, \cdot ) belongs to A\mathcal {A}; the case A=WAP(G)\mathcal {A}=W\hskip -0.7mm A\hskip -0.2mm P(\mathcal {G}), the algebra of weakly almost periodic functions on G\mathcal {G}, recovers stability. If the topology of GG is induced by a left invariant metric dd, we prove that A\mathcal {A} determines the topology of G\mathcal {G} if and only if dd is uniformly equivalent to a left invariant A\mathcal {A}-metric. As an application, we show that the additive group of C[0,1]C[0,1] is not reflexively representable; this is a new proof of Megrelishvili [Topological transformation groups: selected topics, Elsevier, 2007, Question 6.7] (the problem was already solved by Ferri and Galindo [Studia Math. 193 (2009), pp. 99–108] with different methods and later the results were generalized by Yaacov, Berenstein, and Ferri [Math. Z. 267 (2011), pp.129–138]). Let now G\mathcal {G} be a metric group, and assume A⊆LUC(G)\mathcal {A}\subseteq \mathrm {LUC}(\mathcal {G}), the algebra of bounded left uniformly continuous functions on G\mathcal {G}, is a unital C∗C^*-algebra which is the uniform closure of coefficients of representations of G\mathcal {G} on members of F\mathscr {F}, where F\mathscr {F} is a class of Banach spaces closed under ℓ2\ell _2-direct sums. We prove that A\mathcal {A} determines the topology of G\mathcal {G} if and only if G\mathcal {G} embeds into the isometry group of a member of F\mathscr {F}, equipped with the weak operator topology. As applications, we obtain characterizations of unitary and reflexive representability.
我们建立了在一类(良好的)巴拿赫空间上度量群的可表示性的一般框架。更确切地说,让 G \mathcal {G} 是一个拓扑群,而 A \mathcal {A} 是 U C ( G ) \mathrm {UC}(\mathcal {G}) 的有界对称 C ∗ C^* - 子代数,即 G \mathcal {G} 上有界均匀连续函数的代数。从稳定度量的概念出发,我们研究 A \mathcal {A} -metrics δ \delta , 即、函数 δ ( e , ⋅ ) \delta (e, \cdot ) 属于 A \mathcal {A};在 A = W A P ( G ) \mathcal {A}=W\hskip -0.7mm A\hskip -0.2mm P(\mathcal {G}) 的情况下,G 上弱几乎周期函数的代数 恢复稳定。如果 G G 的拓扑由左不变度量 d d 引起,我们证明当且仅当 d d 均匀等价于左不变 A \mathcal {A} -度量时,A \mathcal {A} 决定 G \mathcal {G} 的拓扑。作为一个应用,我们证明了 C [ 0 , 1 ] 的加法群 C[0,1] 不可反身表示;这是 Megrelishvili [Topological transformation groups: selected topics, Elsevier, 2007, Question 6.7] 的一个新证明(这个问题早在 G [0 , 1] C[0,1] 中就由 Megrelishvili 解决了)。(费里和加林多 [Studia Math. 193 (2009), pp. 99-108] 用不同的方法解决了这个问题,后来雅科夫、贝伦斯坦和费里 [Math. Z. 267 (2011), pp.129-138] 对结果进行了推广)。现在让 G (mathcal {G})是一个度量群,并假设 A ⊆ L U C ( G ) \mathcal {A} \subseteq \mathrm {LUC}(\mathcal {G}) , G (mathcal {G})上有界左均匀连续函数的代数,是一个独元 C ∗ \mathrm {LUC}(\mathcal {G})。 是一个一元 C ∗ C^* -代数,它是 G 在 F (mathscr {F} 的成员)上的表示的系数的均匀闭包。 其中,F 是一类在 ℓ 2 \ell _2 -direct sums 下封闭的巴拿赫空间。我们证明,当且仅当 G嵌入到 F 的一个成员的等几何群中时,A 才决定 G 的拓扑结构。 的等几何群中,并配备弱算子拓扑。作为应用,我们得到了单元可表示性和反射可表示性的特征。
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All articles submitted to this journal are peer-reviewed. The AMS has a single blind peer-review process in which the reviewers know who the authors of the manuscript are, but the authors do not have access to the information on who the peer reviewers are.
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