Mathematics in Lean
1. Introduction
2. Basics
3. Logic
4. Sets and Functions
5. Elementary Number Theory
6. Structures
7. Hierarchies
8. Groups and Rings
9. Linear algebra
10. Topology
11. Differential Calculus
12. Integration and Measure Theory
Index
Mathematics in Lean
Mathematics in Lean
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Mathematics in Lean
1. Introduction
1.1. Getting Started
1.2. Overview
2. Basics
2.1. Calculating
2.2. Proving Identities in Algebraic Structures
2.3. Using Theorems and Lemmas
2.4. More examples using apply and rw
2.5. Proving Facts about Algebraic Structures
3. Logic
3.1. Implication and the Universal Quantifier
3.2. The Existential Quantifier
3.3. Negation
3.4. Conjunction and Iff
3.5. Disjunction
3.6. Sequences and Convergence
4. Sets and Functions
4.1. Sets
4.2. Functions
4.3. The Schröder-Bernstein Theorem
5. Elementary Number Theory
5.1. Irrational Roots
5.2. Induction and Recursion
5.3. Infinitely Many Primes
6. Structures
6.1. Defining structures
6.2. Algebraic Structures
6.3. Building the Gaussian Integers
7. Hierarchies
7.1. Basics
7.2. Morphisms
7.3. Sub-objects
8. Groups and Rings
8.1. Monoids and Groups
8.2. Rings
9. Linear algebra
9.1. Vector spaces and linear maps
9.2. Subspaces and quotients
9.3. Endomorphisms
9.4. Matrices, bases and dimension
10. Topology
10.1. Filters
10.2. Metric spaces
10.3. Topological spaces
11. Differential Calculus
11.1. Elementary Differential Calculus
11.2. Differential Calculus in Normed Spaces
12. Integration and Measure Theory
12.1. Elementary Integration
12.2. Measure Theory
12.3. Integration