Trees/ Jean-Pierre Serre

Ch. I. Trees and Amalgams --
1. Amalgams --
1.1. Direct limits --
1.2. Structure of amalgams --
1.3. Consequences of the structure theorem --
1.4. Constructions using amalgams --
1.5. Examples --
2. Trees --
2.1. Graphs --
2.2. Trees --
2.3. Subtrees of a graph --
3. Trees and free groups --
3.1. Trees of representatives --
3.2. Graph of a free group --
3.3. Free actions on a tree --
3.4. Application: Schreier's theorem --
App. Presentation of a group of homeomorphisms --
4. Trees and amalgams --
4.1. The case of two factors --
4.2. Examples of trees associated with amalgams --
4.3. Applications --
4.4. Limit of a tree of groups --
4.5. Amalgams and fundamental domains (general case) --
5. Structure of a group acting on a tree --
5.1. Fundamental group of a graph of groups --
5.2. Reduced words --
5.3. Universal covering relative to a graph of groups --
5.4. Structure theorem --
5.5. Application: Kurosh's theorem --
6. Amalgams and fixed points --
6.1. The fixed point property for groups acting on trees --
6.2. Consequences of property (FA) --
6.3. Examples --
6.4. Fixed points of an automorphism of a tree --
6.5. Groups with fixed points (auxiliary results) --
6.6. The case of SL[subscript 3](Z) --
Ch. II. SL[subscript 2] --
1. The tree of SL[subscript 2] over a local field --
1.1. The tree --
1.2. The groups GL(V) and SL(V) --
1.3. Action of GL(V) on the tree of V; stabilizers --
1.4. Amalgams --
1.5. Ihara's theorem --
1.6. Nagao's theorem --
1.7. Connection with Tits systems --
2. Arithmetic subgroups of the groups GL[subscript 2] and SL[subscript 2] over a function field of one variable --
2.1. Interpretation of the vertices of [Gamma]\X as classes of vector bundles of rank 2 over C --
2.2. Bundles of rank 1 and decomposable bundles --
2.3. Structure of [Gamma]\X --
2.4. Examples --
2.5. Structure of [Gamma] --
2.6. Auxiliary results --
2.7. Structure of [Gamma]: case of a finite field --
2.8. Homology --
2.9. Euler-Poincare characteristic.