Doctorate program: Functional Analysis - Lecture 1: Linear spaces: definition, examples and ...
Doctorate program: Functional Analysis - Lecure 11: Geometric Hanh-Banach theorems
Doctorate program: Functional Analysis - Lecture 10: Convex sets and gauge functions
Doctorate program: Functional Analysis - Lecture 19C - Generalized derivatives and Sobolev spaces
Doctorate program: Functional Analysis - Lecture 36: An application to integral operators
Doctorate program: Functional Analysis - Lecture 3: Normed linear spaces: definition and basic...
Doctorate program: Functional Analysis - Lecture 24: Weak* topology
Doctorate program: Functional Analysis - Lecture 19: Orthonormal bases
Doctorate program: Functional Analysis - Lecture 6: Examples of normed linear spaces
Doctorate program: Functional Analysis - Lecture 25: Applications of weak convergence
Functional Analysis 9
Doctorate program: Functional Analysis - Lecture 5: Finite dimensional linear spaces
Doctorate program: Functional Analysis - Lecture 13: Extension of bounded linear functionals...
Doctorate program: Functional Analysis - Lecture 9: The Hahn-Banach theorem
Math Talk! Eugene Bilokopytov PhD, functional analysis
Doctorate program: Functional Analysis - Lecture 20: Uniform boundedness principle
Doctorate program: Functional Analysis - Lecture 19A: A quadratic variational problem
Doctorate program: Functional Analysis - Lecture 12: Dual o a normed linear space
Doctorate program: Functional Analysis - Lecture 14: Reflexive spaces
Doctorate program: Functional Analysis - Lecture 31: The closed graph theorem.
Doctorate program: Functional Analysis - Lecture 30: Open map principle.
Doctorate program: Functional Analysis - Lecure 17: Riesz and Lax-Milgram representation theorems
Doctorate program: Functional Analysis - Lecture 8: Zorn's lemma
Doctorate program: Functional Analysis - Lecture 4: Completing a normed linear space
Doctorate program: Functional Analysis - Lecture 2: Linear spaces: quotient spaces and convex...
