Proficient handling of compactness concepts in the norm, weak, and weak*-topology, fundamental understanding of Fredholm operators, compactness in L^1 and the Dunford-Pettis property.
Skills
Knowledge
Separating convex sets in the weak and weak* topology
Proving continuity of operators with respect to weak/weak* topology
Familiarity with topological basics and compactness in the weak/weak* topology
Analyzing Fredholm operators
Identifying and characterizing compactness in L^1
Understanding compactness concepts and the continuity of operator with respect to the weak/weak* topology, familiarity with separation theorems, Introduction to Fredholm theory, Compactness in L^1.
Criteria for evaluation
Language
English and French
Changing subject?
No
Earlier variants
They also cover the requirements of the curriculum (from - to) TM1WKUEOPER: UE Operator theory (2003W-2024S)
