Contributions to the structure theory of non-simple C*-algebras

Department of Mathematical Sciences

Contributions to the structure theory of non-simple C*-algebras

Research output: Book/Report › Ph.D. thesis › Research

Standard

Contributions to the structure theory of non-simple C*-algebras. / Bentmann, Rasmus Moritz.

Department of Mathematical Sciences, Faculty of Science, University of Copenhagen, 2013. 129 p.

Research output: Book/Report › Ph.D. thesis › Research

Harvard

Bentmann, RM 2013, Contributions to the structure theory of non-simple C*-algebras. Department of Mathematical Sciences, Faculty of Science, University of Copenhagen. <https://soeg.kb.dk/permalink/45KBDK_KGL/1pioq0f/alma99122556214705763>

APA

Bentmann, R. M. (2013). Contributions to the structure theory of non-simple C*-algebras. Department of Mathematical Sciences, Faculty of Science, University of Copenhagen. https://soeg.kb.dk/permalink/45KBDK_KGL/1pioq0f/alma99122556214705763

Vancouver

Bentmann RM. Contributions to the structure theory of non-simple C*-algebras. Department of Mathematical Sciences, Faculty of Science, University of Copenhagen, 2013. 129 p.

Author

Bentmann, Rasmus Moritz. / Contributions to the structure theory of non-simple C*-algebras. Department of Mathematical Sciences, Faculty of Science, University of Copenhagen, 2013. 129 p.

Bibtex

@phdthesis{6e8480bda5744ee7acfdc819abc687d7,

title = "Contributions to the structure theory of non-simple C*-algebras",

abstract = "This thesis is mainly concerned with classification results for non-simple purely ininite C*-algebras, specifically Cuntz-Krieger algebras and graph C*-algebras, and continuous fields of Kirchberg algebras. In Article A, we perform some computations concerning projective dimension in filtrated K-theory. In joint work with Sara Arklint and Takeshi Katsura, we provide a range result complementing Gunnar Restor's classification theorem for Cuntz-Kieger algebras (Article B) and we investigate reduction of filtrated K-theory for C*-algebras of real rank zero, thereby obtaining a characterization of Cuntz-Krieger algebras with primitive ideal space of accordion type (Article C). In Article D, we establish a universal coecient theorem computing Eberhard Kirchberg's ideal-related KK-groups over a finite space for algebras with vanishing boundary maps. This result is used to classify certain continuous fields of Kirchberg algebras in Article F. A stronger result for one-parameter continuous fields is obtained in joint work with Marius Dadarlat (Article E). In Article G, we compute Stefan Schwede's n-order for certain triangulated categories of C*-algebras.",

author = "Bentmann, {Rasmus Moritz}",

year = "2013",

language = "English",

isbn = "978-87-7078-985-1",

publisher = "Department of Mathematical Sciences, Faculty of Science, University of Copenhagen",

}

RIS

TY - BOOK

T1 - Contributions to the structure theory of non-simple C*-algebras

AU - Bentmann, Rasmus Moritz

PY - 2013

Y1 - 2013

N2 - This thesis is mainly concerned with classification results for non-simple purely ininite C*-algebras, specifically Cuntz-Krieger algebras and graph C*-algebras, and continuous fields of Kirchberg algebras. In Article A, we perform some computations concerning projective dimension in filtrated K-theory. In joint work with Sara Arklint and Takeshi Katsura, we provide a range result complementing Gunnar Restor's classification theorem for Cuntz-Kieger algebras (Article B) and we investigate reduction of filtrated K-theory for C*-algebras of real rank zero, thereby obtaining a characterization of Cuntz-Krieger algebras with primitive ideal space of accordion type (Article C). In Article D, we establish a universal coecient theorem computing Eberhard Kirchberg's ideal-related KK-groups over a finite space for algebras with vanishing boundary maps. This result is used to classify certain continuous fields of Kirchberg algebras in Article F. A stronger result for one-parameter continuous fields is obtained in joint work with Marius Dadarlat (Article E). In Article G, we compute Stefan Schwede's n-order for certain triangulated categories of C*-algebras.

AB - This thesis is mainly concerned with classification results for non-simple purely ininite C*-algebras, specifically Cuntz-Krieger algebras and graph C*-algebras, and continuous fields of Kirchberg algebras. In Article A, we perform some computations concerning projective dimension in filtrated K-theory. In joint work with Sara Arklint and Takeshi Katsura, we provide a range result complementing Gunnar Restor's classification theorem for Cuntz-Kieger algebras (Article B) and we investigate reduction of filtrated K-theory for C*-algebras of real rank zero, thereby obtaining a characterization of Cuntz-Krieger algebras with primitive ideal space of accordion type (Article C). In Article D, we establish a universal coecient theorem computing Eberhard Kirchberg's ideal-related KK-groups over a finite space for algebras with vanishing boundary maps. This result is used to classify certain continuous fields of Kirchberg algebras in Article F. A stronger result for one-parameter continuous fields is obtained in joint work with Marius Dadarlat (Article E). In Article G, we compute Stefan Schwede's n-order for certain triangulated categories of C*-algebras.

UR - https://soeg.kb.dk/permalink/45KBDK_KGL/1pioq0f/alma99122556214705763

M3 - Ph.D. thesis

SN - 978-87-7078-985-1

BT - Contributions to the structure theory of non-simple C*-algebras

PB - Department of Mathematical Sciences, Faculty of Science, University of Copenhagen

ER -

ID: 92314874