Linear Algebra

Linear Algebra

nptelhrd via YouTube Direct link

Mod-13 Lec-47 Properties of the Adjoint Operation. Inner Product Space Isomorphism

48 of 52

48 of 52

Mod-13 Lec-47 Properties of the Adjoint Operation. Inner Product Space Isomorphism

Class Central Classrooms beta

YouTube videos curated by Class Central.

Classroom Contents

Linear Algebra

Automatically move to the next video in the Classroom when playback concludes

  1. 1 Mod-01 Lec-01 Introduction to the Course Contents.
  2. 2 Mod-01 Lec-02 Linear Equations
  3. 3 Mod-01 Lec-03a Equivalent Systems of Linear Equations I: Inverses of Elementary Row-operations
  4. 4 Mod-01 Lec-03b Equivalent Systems of Linear Equations II: Homogeneous Equations, Examples
  5. 5 Mod-01 Lec-04 Row-reduced Echelon Matrices
  6. 6 Mod-01 Lec-05 Row-reduced Echelon Matrices and Non-homogeneous Equations
  7. 7 Mod-01 Lec-06 Elementary Matrices, Homogeneous Equations and Non-homogeneous Equations
  8. 8 Mod-01 Lec-07 Invertible matrices, Homogeneous Equations Non-homogeneous Equations
  9. 9 Mod-02 Lec-08 Vector spaces
  10. 10 Mod-02 Lec-09 Elementary Properties in Vector Spaces. Subspaces
  11. 11 Mod-02 Lec-10 Subspaces (continued), Spanning Sets, Linear Independence, Dependence
  12. 12 Mod-03 Lec-11 Basis for a vector space
  13. 13 Mod-03 Lec-12 Dimension of a vector space
  14. 14 Mod-03 Lec-13 Dimensions of Sums of Subspaces
  15. 15 Mod-04 Lec-14 Linear Transformations
  16. 16 Mod-04 Lec-15 The Null Space and the Range Space of a Linear Transformation
  17. 17 Mod-04 Lec-16 The Rank-Nullity-Dimension Theorem. Isomorphisms Between Vector Spaces
  18. 18 Mod-04 Lec-17 Isomorphic Vector Spaces, Equality of the Row-rank and the Column-rank I
  19. 19 Mod-04 Lec-18 Equality of the Row-rank and the Column-rank II
  20. 20 Mod-05 Lec19 The Matrix of a Linear Transformation
  21. 21 Mod-05 Lec-20 Matrix for the Composition and the Inverse. Similarity Transformation
  22. 22 Mod-06 Lec-21 Linear Functionals. The Dual Space. Dual Basis I
  23. 23 Mod-06 Lec-22 Dual Basis II. Subspace Annihilators I
  24. 24 Mod-06 Lec-23 Subspace Annihilators II
  25. 25 Mod-06 Lec-24 The Double Dual. The Double Annihilator
  26. 26 Mod-06 Lec-25 The Transpose of a Linear Transformation. Matrices of a Linear
  27. 27 Mod-07 Lec-26 Eigenvalues and Eigenvectors of Linear Operators
  28. 28 Mod-07 Lec-27 Diagonalization of Linear Operators. A Characterization
  29. 29 Mod-07 Lec-28 The Minimal Polynomial
  30. 30 Mod-07 Lec-29 The Cayley-Hamilton Theorem
  31. 31 Mod-08 Lec-30 Invariant Subspaces
  32. 32 Mod-08 Lec-31 Triangulability, Diagonalization in Terms of the Minimal Polynomial
  33. 33 Mod-08 Lec-32 Independent Subspaces and Projection Operators
  34. 34 Mod-09 Lec-33 Direct Sum Decompositions and Projection Operators I
  35. 35 Mod-09 Lec-34 Direct Sum Decomposition and Projection Operators II
  36. 36 Mod-10 Lec-35 The Primary Decomposition Theorem and Jordan Decomposition
  37. 37 Mod-10 Lec-36 Cyclic Subspaces and Annihilators
  38. 38 Mod-10 Lec-37 The Cyclic Decomposition Theorem I
  39. 39 Mod-10 Lec-38 The Cyclic Decomposition Theorem II. The Rational Form
  40. 40 Mod-11 Lec-39 Inner Product Spaces
  41. 41 Mod-11 Lec-40 Norms on Vector spaces. The Gram-Schmidt Procedure I
  42. 42 Mod-11 Lec-41 The Gram-Schmidt Procedure II. The QR Decomposition.
  43. 43 Mod-11 Lec-42 Bessel's Inequality, Parseval's Indentity, Best Approximation
  44. 44 Mod-12 Lec-43 Best Approximation: Least Squares Solutions
  45. 45 Mod-12 Lec-44 Orthogonal Complementary Subspaces, Orthogonal Projections
  46. 46 Mod-12 Lec-45 Projection Theorem. Linear Functionals
  47. 47 Mod-13 Lec-46 The Adjoint Operator
  48. 48 Mod-13 Lec-47 Properties of the Adjoint Operation. Inner Product Space Isomorphism
  49. 49 Mod-14 Lec-48 Unitary Operators
  50. 50 Mod-14 Lec-49 Unitary operators II. Self-Adjoint Operators I.
  51. 51 Mod-14 Lec-50 Self-Adjoint Operators II - Spectral Theorem
  52. 52 Mod-14 Lec-51 Normal Operators - Spectral Theorem

Never Stop Learning.

Get personalized course recommendations, track subjects and courses with reminders, and more.

Someone learning on their laptop while sitting on the floor.