Notes
Math 202A
- Metric Spaces
- Completion
- Completion, ctd.
- Completion, ctd.
- Continuity and Topology
- Weak and Strong Topologies
- Quotient Topologies
- Urysohn's Lemma
- Banach Spaces
- Tietze's Lemma
- Tychonoff's Theorem
- Tychonoff's Theorem, ctd.
- Tychonoff's Equivalence to Axiom of Choice
- Compact Metric Spaces
- Arzela-Ascoli Theorem
- Arzela-Ascoli Theorem, ctd.
- Final Remarks on Topology, Introduction to Measure Theory
- Introduction to Measure Theory, cont., The Borel Premeasure
- The Borel Premeasure, cont.
- Outer Measures
- Outer Measures, cont., Measure Construction
- Uniqueness Condition for Extensions
- Uniqueness Condition for Extensions, cont.
- Introduction to Lebesgue Integration
- Properties of $\mathcal S$-SIFs
- Properties of $\mathcal S$ and $\mu$-measurable Functions
- Equivalent formulation of measurability
- Almost Uniform Convergence
- Convergence in measure
- Riesz-Weyl Theorem
- Representative Elements of the Completion of $\mathrm{SIF}(\mathcal S, mu)$
- Properties of the Lebesgue Integral
- Lebesgue Dominated Convergence Theorem
- Introduction to Functional Analysis
Math 202B
- Hahn-Banach Extension Theorem
- Quotient Spaces, Addendum: Bounded Operators
- Weak and Weak-* Topologies
- Hahn-Banach Separation, Loose Ends
- Convex sets, Hilbert Spaces
- Hilbert Spaces
- Dual of $L^1$
- Lebesgue and Radon-Nikodym
- Introduction to Lattice-Ordered Groups, Normed Vector Lattices
- Stone-Weierstrass Theorem on Lattices