{"title":"紧半单量子群作为高阶图代数的晶体极限","authors":"Marco Matassa, Robert Yuncken","doi":"10.1515/crelle-2023-0047","DOIUrl":null,"url":null,"abstract":"Abstract Let O q [ K ] \\mathcal{O}_{q}[K] be the quantized coordinate ring over the field C ( q ) \\mathbb{C}(q) of rational functions corresponding to a compact semisimple Lie group 𝐾, equipped with its ∗-structure. Let A 0 ⊂ C ( q ) {\\mathbf{A}_{0}}\\subset\\mathbb{C}(q) denote the subring of regular functions at q = 0 q=0 . We introduce an A 0 \\mathbf{A}_{0} -subalgebra O q A 0 [ K ] ⊂ O q [ K ] \\mathcal{O}_{q}^{{\\mathbf{A}_{0}}}[K]\\subset\\mathcal{O}_{q}[K] which is stable with respect to the ∗-structure and which has the following properties with respect to the crystal limit q → 0 q\\to 0 . The specialization of O q [ K ] \\mathcal{O}_{q}[K] at each q ∈ ( 0 , ∞ ) ∖ { 1 } q\\in(0,\\infty)\\setminus\\{1\\} admits a faithful ∗-representation π q \\pi_{q} on a fixed Hilbert space, a result due to Soibelman. We show that, for every element a ∈ O q A 0 [ K ] a\\in\\mathcal{O}_{q}^{{\\mathbf{A}_{0}}}[K] , the family of operators π q ( a ) \\pi_{q}(a) admits a norm limit as q → 0 q\\to 0 . These limits define a ∗-representation π 0 \\pi_{0} of O q A 0 [ K ] \\mathcal{O}_{q}^{{\\mathbf{A}_{0}}}[K] . We show that the resulting ∗-algebra O [ K 0 ] = π 0 ( O q A 0 [ K ] ) \\mathcal{O}[K_{0}]=\\pi_{0}(\\mathcal{O}_{q}^{{\\mathbf{A}_{0}}}[K]) is a Kumjian–Pask algebra, in the sense of Aranda Pino, Clark, an Huef and Raeburn. We give an explicit description of the underlying higher-rank graph in terms of crystal basis theory. As a consequence, we obtain a continuous field of C * C^{*} -algebras ( C ( K q ) ) q ∈ [ 0 , ∞ ] (C(K_{q}))_{q\\in[0,\\infty]} , where the fibres at q = 0 q=0 and ∞ are explicitly defined higher-rank graph algebras.","PeriodicalId":1,"journal":{"name":"Accounts of Chemical Research","volume":null,"pages":null},"PeriodicalIF":16.4000,"publicationDate":"2022-08-28","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"4","resultStr":"{\"title\":\"Crystal limits of compact semisimple quantum groups as higher-rank graph algebras\",\"authors\":\"Marco Matassa, Robert Yuncken\",\"doi\":\"10.1515/crelle-2023-0047\",\"DOIUrl\":null,\"url\":null,\"abstract\":\"Abstract Let O q [ K ] \\\\mathcal{O}_{q}[K] be the quantized coordinate ring over the field C ( q ) \\\\mathbb{C}(q) of rational functions corresponding to a compact semisimple Lie group 𝐾, equipped with its ∗-structure. Let A 0 ⊂ C ( q ) {\\\\mathbf{A}_{0}}\\\\subset\\\\mathbb{C}(q) denote the subring of regular functions at q = 0 q=0 . We introduce an A 0 \\\\mathbf{A}_{0} -subalgebra O q A 0 [ K ] ⊂ O q [ K ] \\\\mathcal{O}_{q}^{{\\\\mathbf{A}_{0}}}[K]\\\\subset\\\\mathcal{O}_{q}[K] which is stable with respect to the ∗-structure and which has the following properties with respect to the crystal limit q → 0 q\\\\to 0 . The specialization of O q [ K ] \\\\mathcal{O}_{q}[K] at each q ∈ ( 0 , ∞ ) ∖ { 1 } q\\\\in(0,\\\\infty)\\\\setminus\\\\{1\\\\} admits a faithful ∗-representation π q \\\\pi_{q} on a fixed Hilbert space, a result due to Soibelman. We show that, for every element a ∈ O q A 0 [ K ] a\\\\in\\\\mathcal{O}_{q}^{{\\\\mathbf{A}_{0}}}[K] , the family of operators π q ( a ) \\\\pi_{q}(a) admits a norm limit as q → 0 q\\\\to 0 . These limits define a ∗-representation π 0 \\\\pi_{0} of O q A 0 [ K ] \\\\mathcal{O}_{q}^{{\\\\mathbf{A}_{0}}}[K] . We show that the resulting ∗-algebra O [ K 0 ] = π 0 ( O q A 0 [ K ] ) \\\\mathcal{O}[K_{0}]=\\\\pi_{0}(\\\\mathcal{O}_{q}^{{\\\\mathbf{A}_{0}}}[K]) is a Kumjian–Pask algebra, in the sense of Aranda Pino, Clark, an Huef and Raeburn. We give an explicit description of the underlying higher-rank graph in terms of crystal basis theory. As a consequence, we obtain a continuous field of C * C^{*} -algebras ( C ( K q ) ) q ∈ [ 0 , ∞ ] (C(K_{q}))_{q\\\\in[0,\\\\infty]} , where the fibres at q = 0 q=0 and ∞ are explicitly defined higher-rank graph algebras.\",\"PeriodicalId\":1,\"journal\":{\"name\":\"Accounts of Chemical Research\",\"volume\":null,\"pages\":null},\"PeriodicalIF\":16.4000,\"publicationDate\":\"2022-08-28\",\"publicationTypes\":\"Journal Article\",\"fieldsOfStudy\":null,\"isOpenAccess\":false,\"openAccessPdf\":\"\",\"citationCount\":\"4\",\"resultStr\":null,\"platform\":\"Semanticscholar\",\"paperid\":null,\"PeriodicalName\":\"Accounts of Chemical Research\",\"FirstCategoryId\":\"100\",\"ListUrlMain\":\"https://doi.org/10.1515/crelle-2023-0047\",\"RegionNum\":1,\"RegionCategory\":\"化学\",\"ArticlePicture\":[],\"TitleCN\":null,\"AbstractTextCN\":null,\"PMCID\":null,\"EPubDate\":\"\",\"PubModel\":\"\",\"JCR\":\"Q1\",\"JCRName\":\"CHEMISTRY, MULTIDISCIPLINARY\",\"Score\":null,\"Total\":0}","platform":"Semanticscholar","paperid":null,"PeriodicalName":"Accounts of Chemical Research","FirstCategoryId":"100","ListUrlMain":"https://doi.org/10.1515/crelle-2023-0047","RegionNum":1,"RegionCategory":"化学","ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q1","JCRName":"CHEMISTRY, MULTIDISCIPLINARY","Score":null,"Total":0}
Crystal limits of compact semisimple quantum groups as higher-rank graph algebras
Abstract Let O q [ K ] \mathcal{O}_{q}[K] be the quantized coordinate ring over the field C ( q ) \mathbb{C}(q) of rational functions corresponding to a compact semisimple Lie group 𝐾, equipped with its ∗-structure. Let A 0 ⊂ C ( q ) {\mathbf{A}_{0}}\subset\mathbb{C}(q) denote the subring of regular functions at q = 0 q=0 . We introduce an A 0 \mathbf{A}_{0} -subalgebra O q A 0 [ K ] ⊂ O q [ K ] \mathcal{O}_{q}^{{\mathbf{A}_{0}}}[K]\subset\mathcal{O}_{q}[K] which is stable with respect to the ∗-structure and which has the following properties with respect to the crystal limit q → 0 q\to 0 . The specialization of O q [ K ] \mathcal{O}_{q}[K] at each q ∈ ( 0 , ∞ ) ∖ { 1 } q\in(0,\infty)\setminus\{1\} admits a faithful ∗-representation π q \pi_{q} on a fixed Hilbert space, a result due to Soibelman. We show that, for every element a ∈ O q A 0 [ K ] a\in\mathcal{O}_{q}^{{\mathbf{A}_{0}}}[K] , the family of operators π q ( a ) \pi_{q}(a) admits a norm limit as q → 0 q\to 0 . These limits define a ∗-representation π 0 \pi_{0} of O q A 0 [ K ] \mathcal{O}_{q}^{{\mathbf{A}_{0}}}[K] . We show that the resulting ∗-algebra O [ K 0 ] = π 0 ( O q A 0 [ K ] ) \mathcal{O}[K_{0}]=\pi_{0}(\mathcal{O}_{q}^{{\mathbf{A}_{0}}}[K]) is a Kumjian–Pask algebra, in the sense of Aranda Pino, Clark, an Huef and Raeburn. We give an explicit description of the underlying higher-rank graph in terms of crystal basis theory. As a consequence, we obtain a continuous field of C * C^{*} -algebras ( C ( K q ) ) q ∈ [ 0 , ∞ ] (C(K_{q}))_{q\in[0,\infty]} , where the fibres at q = 0 q=0 and ∞ are explicitly defined higher-rank graph algebras.
期刊介绍:
Accounts of Chemical Research presents short, concise and critical articles offering easy-to-read overviews of basic research and applications in all areas of chemistry and biochemistry. These short reviews focus on research from the author’s own laboratory and are designed to teach the reader about a research project. In addition, Accounts of Chemical Research publishes commentaries that give an informed opinion on a current research problem. Special Issues online are devoted to a single topic of unusual activity and significance.
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