Mathematical Physics

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1 . Introduction; 2 . Categories; 3. The Category of Groups; 4. Subgroups; 5 . Normal Subgroups; 6. Homomorphisms; 7. Direct Products and Sums of Groups; 8. Relations; 9. The Category of Vector Spaces; 10 . Subspaces; 11 . Linear Mappings; Direct Products and Sums; 12 . From Real to Complex Vector Spaces and Back; 13 . Duals; 14 . Multilinear Mappings; Tensor Products; 15 . Example: Minkowski Vector Space; 16 . Example: The Lorentz Group; 17 . Functors; 18 . The Category of Associative Algebras; 19 . The Category of Lie Algebras; 20 . Example: The Algebra of Observables. 21. Example: Fock Vector Space22. Representations: General Theory; 23 . Representations on Vector Spaces; 24 . The Algebraic Categories: Summary; 25 . Subsets and Mappings; 26. Topological Spaces; 27. Continuous Mappings; 28 . The Category of Topological Spaces; 29. Nets; 30. Compactness; 31. The Compact-Open Topology; 32. Connectedness; 33. Example: Dynamical Systems; 34. Homotopy; 35. Homology; 36. Homology: Relation to Homotopy; 37. The Homology Functors; 38. Uniform Spaces; 39. The Completion of a Uniform Space; 40. Topological Groups; 41. Topological Vector Spaces. 42. Categories: Summary43. Measure Spaces; 44. Constructing Measure Spaces; 45. Measurable Functions; 46. Integrals; 47. Distributions; 48. Hilbert Spaces; 49. Bounded Operators; 50. The Spectrum of a Bounded Operator; 51. The Spectral Theorem: Finite-dimensional Case; 52. Continuous Functions of a Hermitian Operator; 53. Other Functions of a Hermitian Operator; 54. The Spectral Theorem; 55. Operators (Not Necessarily Bounded); 56. Self-Adjoint Operators; Index of Defined Terms