The stable exotic Cuntz algebras are higher-rank graph algebras

Proceedings of the American Mathematical Society, Series B Pub Date : 2024-03-05 DOI:10.1090/bproc/180

Jeffrey L. Boersema, Sarah Browne, Elizabeth Gillaspy

{"title":"The stable exotic Cuntz algebras are higher-rank graph algebras","authors":"Jeffrey L. Boersema, Sarah Browne, Elizabeth Gillaspy","doi":"10.1090/bproc/180","DOIUrl":null,"url":null,"abstract":"<p>For each odd integer <inline-formula content-type=\"math/mathml\">\n<mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"n greater-than-or-equal-to 3\">\n <mml:semantics>\n <mml:mrow>\n <mml:mi>n</mml:mi>\n <mml:mo>≥</mml:mo>\n <mml:mn>3</mml:mn>\n </mml:mrow>\n <mml:annotation encoding=\"application/x-tex\">n \\geq 3</mml:annotation>\n </mml:semantics>\n</mml:math>\n</inline-formula>, we construct a rank-3 graph <inline-formula content-type=\"math/mathml\">\n<mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"normal upper Lamda Subscript n\">\n <mml:semantics>\n <mml:msub>\n <mml:mi mathvariant=\"normal\">Λ</mml:mi>\n <mml:mi>n</mml:mi>\n </mml:msub>\n <mml:annotation encoding=\"application/x-tex\">\\Lambda _n</mml:annotation>\n </mml:semantics>\n</mml:math>\n</inline-formula> with involution <inline-formula content-type=\"math/mathml\">\n<mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"gamma Subscript n\">\n <mml:semantics>\n <mml:msub>\n <mml:mi>γ</mml:mi>\n <mml:mi>n</mml:mi>\n </mml:msub>\n <mml:annotation encoding=\"application/x-tex\">\\gamma _n</mml:annotation>\n </mml:semantics>\n</mml:math>\n</inline-formula> whose real <inline-formula content-type=\"math/mathml\">\n<mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"upper C Superscript asterisk\">\n <mml:semantics>\n <mml:msup>\n <mml:mi>C</mml:mi>\n <mml:mo>∗</mml:mo>\n </mml:msup>\n <mml:annotation encoding=\"application/x-tex\">C^*</mml:annotation>\n </mml:semantics>\n</mml:math>\n</inline-formula>-algebra <inline-formula content-type=\"math/mathml\">\n<mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"upper C Subscript double-struck upper R Superscript asterisk Baseline left-parenthesis normal upper Lamda Subscript n Baseline comma gamma Subscript n Baseline right-parenthesis\">\n <mml:semantics>\n <mml:mrow>\n <mml:msubsup>\n <mml:mi>C</mml:mi>\n <mml:mrow class=\"MJX-TeXAtom-ORD\">\n <mml:mstyle displaystyle=\"false\" scriptlevel=\"2\">\n <mml:mrow class=\"MJX-TeXAtom-ORD\">\n <mml:mi mathvariant=\"double-struck\">R</mml:mi>\n </mml:mrow>\n </mml:mstyle>\n </mml:mrow>\n <mml:mo>∗</mml:mo>\n </mml:msubsup>\n <mml:mo stretchy=\"false\">(</mml:mo>\n <mml:msub>\n <mml:mi mathvariant=\"normal\">Λ</mml:mi>\n <mml:mi>n</mml:mi>\n </mml:msub>\n <mml:mo>,</mml:mo>\n <mml:msub>\n <mml:mi>γ</mml:mi>\n <mml:mi>n</mml:mi>\n </mml:msub>\n <mml:mo stretchy=\"false\">)</mml:mo>\n </mml:mrow>\n <mml:annotation encoding=\"application/x-tex\">C^*_{\\scriptscriptstyle \\mathbb {R}}(\\Lambda _n, \\gamma _n)</mml:annotation>\n </mml:semantics>\n</mml:math>\n</inline-formula> is stably isomorphic to the exotic Cuntz algebra <inline-formula content-type=\"math/mathml\">\n<mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"script upper E Subscript n\">\n <mml:semantics>\n <mml:msub>\n <mml:mrow class=\"MJX-TeXAtom-ORD\">\n <mml:mi class=\"MJX-tex-caligraphic\" mathvariant=\"script\">E</mml:mi>\n </mml:mrow>\n <mml:mi>n</mml:mi>\n </mml:msub>\n <mml:annotation encoding=\"application/x-tex\">\\mathcal E_n</mml:annotation>\n </mml:semantics>\n</mml:math>\n</inline-formula>. This construction is optimal, as we prove that a rank-2 graph with involution <inline-formula content-type=\"math/mathml\">\n<mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"left-parenthesis normal upper Lamda comma gamma right-parenthesis\">\n <mml:semantics>\n <mml:mrow>\n <mml:mo stretchy=\"false\">(</mml:mo>\n <mml:mi mathvariant=\"normal\">Λ</mml:mi>\n <mml:mo>,</mml:mo>\n <mml:mi>γ</mml:mi>\n <mml:mo stretchy=\"false\">)</mml:mo>\n </mml:mrow>\n <mml:annotation encoding=\"application/x-tex\">(\\Lambda ,\\gamma )</mml:annotation>\n </mml:semantics>\n</mml:math>\n</inline-formula> can never satisfy <inline-formula content-type=\"math/mathml\">\n<mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"upper C Subscript double-struck upper R Superscript asterisk Baseline left-parenthesis normal upper Lamda comma gamma right-parenthesis tilde Subscript upper M upper E Baseline script upper E Subscript n\">\n <mml:semantics>\n <mml:mrow>\n <mml:msubsup>\n <mml:mi>C</mml:mi>\n <mml:mrow class=\"MJX-TeXAtom-ORD\">\n <mml:mstyle displaystyle=\"false\" scriptlevel=\"2\">\n <mml:mrow class=\"MJX-TeXAtom-ORD\">\n <mml:mi mathvariant=\"double-struck\">R</mml:mi>\n </mml:mrow>\n </mml:mstyle>\n </mml:mrow>\n <mml:mo>∗</mml:mo>\n </mml:msubsup>\n <mml:mo stretchy=\"false\">(</mml:mo>\n <mml:mi mathvariant=\"normal\">Λ</mml:mi>\n <mml:mo>,</mml:mo>\n <mml:mi>γ</mml:mi>\n <mml:mo stretchy=\"false\">)</mml:mo>\n <mml:msub>\n <mml:mo>∼</mml:mo>\n <mml:mrow class=\"MJX-TeXAtom-ORD\">\n <mml:mi>M</mml:mi>\n <mml:mi>E</mml:mi>\n </mml:mrow>\n </mml:msub>\n <mml:msub>\n <mml:mrow class=\"MJX-TeXAtom-ORD\">\n <mml:mi class=\"MJX-tex-caligraphic\" mathvariant=\"script\">E</mml:mi>\n </mml:mrow>\n <mml:mi>n</mml:mi>\n </mml:msub>\n </mml:mrow>\n <mml:annotation encoding=\"application/x-tex\">C^*_{\\scriptscriptstyle \\mathbb {R}}(\\Lambda , \\gamma )\\sim _{ME} \\mathcal E_n</mml:annotation>\n </mml:semantics>\n</mml:math>\n</inline-formula>, and Boersema reached the same conclusion for rank-1 graphs (directed graphs) in [Münster J. Math. <bold>10</bold> (2017), pp. 485–521, Corollary 4.3]. Our construction relies on a rank-1 graph with involution <inline-formula content-type=\"math/mathml\">\n<mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"left-parenthesis normal upper Lamda comma gamma right-parenthesis\">\n <mml:semantics>\n <mml:mrow>\n <mml:mo stretchy=\"false\">(</mml:mo>\n <mml:mi mathvariant=\"normal\">Λ</mml:mi>\n <mml:mo>,</mml:mo>\n <mml:mi>γ</mml:mi>\n <mml:mo stretchy=\"false\">)</mml:mo>\n </mml:mrow>\n <mml:annotation encoding=\"application/x-tex\">(\\Lambda , \\gamma )</mml:annotation>\n </mml:semantics>\n</mml:math>\n</inline-formula> whose real <inline-formula content-type=\"math/mathml\">\n<mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"upper C Superscript asterisk\">\n <mml:semantics>\n <mml:msup>\n <mml:mi>C</mml:mi>\n <mml:mo>∗</mml:mo>\n </mml:msup>\n <mml:annotation encoding=\"application/x-tex\">C^*</mml:annotation>\n </mml:semantics>\n</mml:math>\n</inline-formula>-algebra <inline-formula content-type=\"math/mathml\">\n<mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"upper C Subscript double-struck upper R Superscript asterisk Baseline left-parenthesis normal upper Lamda comma gamma right-parenthesis\">\n <mml:semantics>\n <mml:mrow>\n <mml:msubsup>\n <mml:mi>C</mml:mi>\n <mml:mrow class=\"MJX-TeXAtom-ORD\">\n <mml:mstyle displaystyle=\"false\" scriptlevel=\"2\">\n <mml:mrow class=\"MJX-TeXAtom-ORD\">\n <mml:mi mathvariant=\"double-struck\">R</mml:mi>\n </mml:mrow>\n </mml:mstyle>\n </mml:mrow>\n <mml:mo>∗</mml:mo>\n </mml:msubsup>\n <mml:mo stretchy=\"false\">(</mml:mo>\n <mml:mi mathvariant=\"normal\">Λ</mml:mi>\n <mml:mo>,</mml:mo>\n <mml:mi>γ</mml:mi>\n <mml:mo stretchy=\"false\">)</mml:mo>\n </mml:mrow>\n <mml:annotation encoding=\"application/x-tex\">C^*_{\\scriptscriptstyle \\mathbb {R}}(\\Lambda , \\gamma )</mml:annotation>\n </mml:semantics>\n</mml:math>\n</inline-formula> is stably isomorphic to the suspension <inline-formula content-type=\"math/mathml\">\n<mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"upper S double-struck upper R\">\n <mml:semantics>\n <mml:mrow>\n <mml:mi>S</mml:mi>\n <mml:mrow class=\"MJX-TeXAtom-ORD\">\n <mml:mi mathvariant=\"double-struck\">R</mml:mi>\n </mml:mrow>\n </mml:mrow>\n <mml:annotation encoding=\"application/x-tex\">S \\mathbb {R}</mml:annotation>\n </mml:semantics>\n</mml:math>\n</inline-formula>. In the Appendix, we show that the <inline-formula content-type=\"math/mathml\">\n<mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"i\">\n <mml:semantics>\n <mml:mi>i</mml:mi>\n <mml:annotation encoding=\"application/x-tex\">i</mml:annotation>\n </mml:semantics>\n</mml:math>\n</inline-formula>-fold suspension <inline-formula content-type=\"math/mathml\">\n<mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"upper S Superscript i Baseline double-struck upper R\">\n <mml:semantics>\n <mml:mrow>\n <mml:msup>\n <mml:mi>S</mml:mi>\n <mml:mi>i</mml:mi>\n </mml:msup>\n <mml:mrow class=\"MJX-TeXAtom-ORD\">\n <mml:mi mathvariant=\"double-struck\">R</mml:mi>\n </mml:mrow>\n </mml:mrow>\n <mml:annotation encoding=\"application/x-tex\">S^i \\mathbb {R}</mml:annotation>\n </mml:semantics>\n</mml:math>\n</inline-formula> is stably isomorphic to a graph algebra iff <inline-formula content-type=\"math/mathml\">\n<mml:math xmlns:mml=\"http://www.w3.org/1998/Math/MathML\" alttext=\"negative 2 less-than-or-equal-to i less-than-or-equal-to 1\">\n <mml:semantics>\n <mml:mrow>\n <mml:mo>−</mml:mo>\n <mml:mn>2</mml:mn>\n <mml:mo>≤</mml:mo>\n <mml:mi>i</mml:mi>\n <mml:mo>≤</mml:mo>\n <mml:mn>1</mml:mn>\n </mml:mrow>\n <mml:annotation encoding=\"application/x-tex\">-2 \\leq i \\leq 1</mml:annotation>\n </mml:semantics>\n</mml:math>\n</inline-formula>.</p>","PeriodicalId":106316,"journal":{"name":"Proceedings of the American Mathematical Society, Series B","volume":"118 13","pages":""},"PeriodicalIF":0.0000,"publicationDate":"2024-03-05","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Proceedings of the American Mathematical Society, Series B","FirstCategoryId":"1085","ListUrlMain":"https://doi.org/10.1090/bproc/180","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"","JCRName":"","Score":null,"Total":0}

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Abstract

For each odd integer n ≥ 3 n \geq 3 , we construct a rank-3 graph Λ n \Lambda _n with involution γ n \gamma _n whose real C ∗ C^* -algebra C R ∗ ( Λ n , γ n ) C^*_{\scriptscriptstyle \mathbb {R}}(\Lambda _n, \gamma _n) is stably isomorphic to the exotic Cuntz algebra E n \mathcal E_n . This construction is optimal, as we prove that a rank-2 graph with involution ( Λ , γ ) (\Lambda ,\gamma ) can never satisfy C R ∗ ( Λ , γ ) ∼ M E E n C^*_{\scriptscriptstyle \mathbb {R}}(\Lambda , \gamma )\sim _{ME} \mathcal E_n , and Boersema reached the same conclusion for rank-1 graphs (directed graphs) in [Münster J. Math. 10 (2017), pp. 485–521, Corollary 4.3]. Our construction relies on a rank-1 graph with involution ( Λ , γ ) (\Lambda , \gamma ) whose real C ∗ C^* -algebra C R ∗ ( Λ , γ ) C^*_{\scriptscriptstyle \mathbb {R}}(\Lambda , \gamma ) is stably isomorphic to the suspension S R S \mathbb {R} . In the Appendix, we show that the i i -fold suspension S i R S^i \mathbb {R} is stably isomorphic to a graph algebra iff − 2 ≤ i ≤ 1 -2 \leq i \leq 1 .

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稳定的异域 Cuntz 对象是高阶图对象

对于每个奇整数 n ≥ 3 n \geq 3，我们构造了一个具有反卷 γ n \gamma _n 的秩 3 图Λ n \Lambda _n，其实 C∗ C^* -代数 C R∗ ( Λ n 、 γ n ) C^*_{scriptscriptstyle \mathbb {R}}(\Lambda _n, \gamma _n) 与奇异的 Cuntz 代数 E n \mathcal E_n 稳定同构。这种构造是最优的，因为我们证明了带有卷积 ( Λ , γ ) (\Lambda ,\gamma ) 的秩 2 图永远不会满足 C R∗ ( Λ , γ ) ∼ M E E n C^*_{\scriptscriptstyle \mathbb {R}}(\Lambda , \gamma )\sim _{ME} 。\Boersema 在 [Münster J. Math. 10 (2017), pp.我们的构造依赖于一个具有卷积 ( Λ , γ ) (\Lambda , \gamma ) 的秩-1 图，其实 C∗ C^* -代数 C R∗ ( Λ , γ ) C^*_{\scriptscriptstyle \mathbb {R}}(\Lambda , \gamma ) 与悬浮 S R S \mathbb {R} 稳定同构。在附录中，我们将证明，如果 - 2 ≤ i ≤ 1 -2 \leq i \leq 1 ，那么 i i 层悬浮 S i R S^i \mathbb {R} 与图代数稳定同构。

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