C*-algebras are operator algebras forming the conceptual foundation of noncommutative geometry. Since commutative C*-algebras yield categories anti-equivalent to categories of locally compact Hausdorff spaces by the celebrated Gelfand-Naimark equivalence theorem, noncommutative C*-algebras are viewed as function algebras on quantum spaces. Their study from this point of view is referred to as noncommutative topology. Here KK-theory and index theory are among prime tools leading to significant applications. Graph C*-algebras form a narrow but particularly inspiring class in which the noncommutative topology of quantum spaces is given by the combinatorics of oriented graphs. Graphs provide a very tangible grip on their C*-algebras allowing one to obtain deeper and more explicit results than are attainable in a general abstract setting. In particular, graph C*-algebras are formidably good in instantiating general theory of C*-algebras. The aim of this lecture course is to introduce the basics of C*-algebras while enjoying educating fun with oriented graphs.
C*-ALGEBRAS THAT ONE CAN SEE
External Lecturer:
P.M. Hajac (IMPAN, Warsaw)
Course Type:
PhD Course
Academic Year:
2022-2023
Period:
October
Duration:
20 h
Description:
Research Group:
Location:
A-136