TY - JOUR
T1 - The scattered radical of some C∗-algebras
AU - Cao, Peng
AU - Xiang, Zhang
N1 - Publisher Copyright:
© Tusi Mathematical Research Group (TMRG) 2026.
PY - 2026/4
Y1 - 2026/4
N2 - For a C∗-algebra A, its scattered radicalRs(A) is the largest scattered ideal of A; an ideal is scattered if its elements all have countable spectrum. We say that A is scattered if Rs(A)=A. In this paper, we first show that any scattered von Neumann algebra is finite dimensional and then obtain a complete characterization of scattered radical of von Neumann algebras. Furthermore, we give a topological characterization of Rs(C(M)), that is, Rs(C(M))={f∈C(M):f(P(M))=0}, where M is a Hausdorff compact space and P(M) is the largest perfect subset of M. Finally, we show that Rs(A⊗minB)=Rs(A)⊗minRs(B) if A,B, satisfying one of the following conditions: (i) A,B are C∗-algebras and A,B are exact; (ii) A,B are C∗-algebras and A or B is nuclear.
AB - For a C∗-algebra A, its scattered radicalRs(A) is the largest scattered ideal of A; an ideal is scattered if its elements all have countable spectrum. We say that A is scattered if Rs(A)=A. In this paper, we first show that any scattered von Neumann algebra is finite dimensional and then obtain a complete characterization of scattered radical of von Neumann algebras. Furthermore, we give a topological characterization of Rs(C(M)), that is, Rs(C(M))={f∈C(M):f(P(M))=0}, where M is a Hausdorff compact space and P(M) is the largest perfect subset of M. Finally, we show that Rs(A⊗minB)=Rs(A)⊗minRs(B) if A,B, satisfying one of the following conditions: (i) A,B are C∗-algebras and A,B are exact; (ii) A,B are C∗-algebras and A or B is nuclear.
KW - Projection
KW - Scattered radical
KW - Spectrum
KW - von Neumann algebra
UR - https://www.scopus.com/pages/publications/105028295986
U2 - 10.1007/s43034-025-00489-3
DO - 10.1007/s43034-025-00489-3
M3 - Article
AN - SCOPUS:105028295986
SN - 2639-7390
VL - 17
JO - Annals of Functional Analysis
JF - Annals of Functional Analysis
IS - 2
M1 - 19
ER -