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Updated At Jan 11, 2026, 08:18 PM
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---
name: rudin-real-complex-analysis
description: Problem-solving with Rudin's Real and Complex Analysis textbook
allowed-tools: [Bash, Read]
---
# Rudin's Real and Complex Analysis
Reference skill for Walter Rudin's "Real and Complex Analysis" (3rd Edition) - a graduate-level text covering measure theory, integration, functional analysis, and complex analysis.
## When to Use
Use this skill when working on:
- Measure theory and Lebesgue integration
- Lp spaces and functional analysis
- Complex analysis (analytic functions, contour integration, residues)
- Connections between real and complex analysis
## Topics Covered
### Real Analysis
- Limits and continuity in metric spaces
- Convergence of sequences and series
- Differentiation and integration techniques
- Metric spaces and topology
### Complex Analysis
- Analytic functions and Cauchy-Riemann equations
- Contour integration and Cauchy's theorem
- Residue theorem and applications
- Conformal mappings
- Power series representations
### Topology
- Topological spaces
- Compactness and connectedness
- Metric space topology
### Algebra
- Rings and ideals (in context of function spaces)
## Decision Tree
1. **Measure/Integration Problem?**
- Use Lebesgue dominated convergence
- Check Fatou's lemma for liminf/limsup
- Apply Fubini-Tonelli for iterated integrals
2. **Complex Analysis Problem?**
- Check analyticity via Cauchy-Riemann
- For integrals: residue theorem
- For mappings: Schwarz lemma, conformal properties
3. **Functional Analysis?**
- Riesz representation for duals
- Hahn-Banach for extensions
- Open mapping/closed graph theorems
## Tool Commands
### Query Rudin Content
```bash
uv run python scripts/ragie_query.py --query "YOUR_TOPIC measure integration" --partition math-textbooks --top-k 5
```
### SymPy for Symbolic Computation
```bash
uv run python scripts/sympy_compute.py integrate "exp(-x**2)" --var x --bounds "0,oo"
```
### Z3 for Verification
```bash
uv run python scripts/z3_solve.py prove "forall x, |f(x)| <= M implies bounded"
```
## Key Theorems Reference
| Theorem | Chapter | Use Case |
|---------|---------|----------|
| Dominated Convergence | Ch 1 | Interchange limit and integral |
| Riesz Representation | Ch 2 | Identify dual spaces |
| Cauchy's Theorem | Ch 10 | Contour integrals = 0 for analytic |
| Residue Theorem | Ch 10 | Evaluate real integrals |
| Open Mapping | Ch 5 | Surjective bounded linear maps |
## Cognitive Tools Reference
See `.claude/skills/math-mode/SKILL.md` for full tool documentation.
