Introduction to Algebraic Quantum Field Theory [electronic resource] /

1. Axiomatic Formalism -- 1.1. Introduction. The Algebraic Approach as a Local Quantum Theory -- 1.2. Axioms of the Algebraic Approach -- 1.3. Structure of the Local Quantum Theory: Theorems Derived from the Axioms -- 2. From the Theory of Observables to the Theory of Quantum Fields -- 2.1. Global Theory of Superselection Rules -- 2.2. Local Theory of Superselection Rules: Equivalence Properties of Coherent Sectors -- 2.3. Program for Producing Field Theory by Means of Reconstructing its Charge Sectors -- 3. Field Algebras and their Applications -- 3.1. Op*-Algebras of Field Operators and Vacuum Superselection Rules -- 3.2. Construction and Properties of Von Neumann Field Algebras -- 3.3. Free and Generalized Free Fields -- Appendix. Problems of Constructing Algebraic Gauge Quantum Field Theory -- References.