The noncommutative Shilov boundary
Sammanfattning
We introduce Arveson's generalization of the Shilov boundary to the
noncommutative case and give a proof based on the work of Hamana
of the existence of the Shilov boundary ideal.
Moreover, we describe the Shilov boundary for a noncommutative
analog of the algebra of holomorphic functions on the unit polydisk
Dn and for a q-analog of the algebra of holomorphic functions on the
unit ball in the space of symmetric complex 2 x 2 matrices.
Examinationsnivå
Student essay