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Klappentext Prominent Russian mathematician's concise, well-written exposition considers: n-dimensional spaces, linear and bilinear forms, linear transformations, canonical form of an arbitrary linear transformation, introduction to tensors, more. Not designed as an introductory text. 1961 edition. Inhaltsverzeichnis I. n-Dimensional Spaces. Linear and Bilinear Forms 1. n-Dimensional vector spaces 2. Euclidean space 3. Orthogonal basis. Isomorphism of Euclidean spaces 4. Bilinear and quadratic forms 5. Reduction of a quadratic form to a sum of squares 6. Reduction of a quadratic form by means of a triangular transformation 7. The law of inertia 8. Complex n-dimensional spaceII. Linear Transformations 9. Linear transformations. Operations on linear transformations 10. Invariant subspaces. Eigenvalues and eigenvectors of a linear transformation 11. The adjoint of a linear transformation 12. Self-adjoint (Hermitian) transformations. Simultaneous reduction of a pair of quadratic forms to a sum of squares 13. Unitary transformations 14. Commutative linear transformations. Normal transformations 15. Decomposition of a linear transformation into a product of a unitary and self-adjoint transformation 16. Linear transformations on a real Euclidean space 17. External properties of eigenvaluesIII. The Canonical Form of an Arbitrary Linear Transformation 18. The canonical form of a linear transformation 19. Reduction to canonical form 20. Elementary divisors 21. Polynomial matricesIV. Introduction to Tensors 22. The dual space 23. Tensors
