Cayley-Hamilton Theorem, Eigenvalues, Eigenvectors and Eigenspace.

1. Cayley–Hamilton theorem - Eigenvalues, Eigenvectors and Eigenspaces Isaac Amornortey Yowetu NIMS-GHANA March 17, 2021

2. Cayley–Hamilton theorem Finding Eigenvalues EigenVectors and EigenSpaces Content 1 Cayley–Hamilton theorem 2 Finding Eigenvalues 3 EigenVectors and EigenSpaces

3. Cayley–Hamilton theorem Finding Eigenvalues EigenVectors and EigenSpaces Cayley–Hamilton theorem Every square matrix satisfies its own characteristic equation. Thus: p(λ) = det(λI − A) Substituting the matrix A for λ in the polynomial, p(λ) = det(λI − A) results in a zero matrix. Thus: p(A) = 0

4. Cayley–Hamilton theorem Finding Eigenvalues EigenVectors and EigenSpaces Example : Using Non-singular Matrix Consider the given matrix: A =   2 1 −1 1 2 −1 − −1 2   Find the characteristic equation of the square matrix and hence find the eigenvalues, eigenvectors and eigenspaces.

5. Cayley–Hamilton theorem Finding Eigenvalues EigenVectors and EigenSpaces Solution p(λ) = det(λI − A) (1) =

10. λ   1 0 0 0 1 0 0 0 1   −   2 1 −1 1 2 −1 −1 −1 2  

15. (2) =

20.   λ − 2 −1 1 −1 λ − 2 1 1 1 λ − 2  

25. (3) = (λ − 2)

29. λ − 2 1 1 λ − 2

33. − (−1)

37. −1 1 1 λ − 2

41. (4) +1

45. −1 λ − 2 1 1

50. Cayley–Hamilton theorem Finding Eigenvalues EigenVectors and EigenSpaces Solution Continue p(λ) = (λ − 2)[(λ − 2)2 − 1] + [(−1)(λ − 2) − 1] (5) +[(−1)(1) − 1(λ − 2)] = (λ − 2)(λ2 − 4λ + 3) − 2(λ − 1) (6) = (λ − 2)(λ − 3)(λ − 1) − 2(λ − 1) (7) = (λ − 1)[(λ − 3)(λ − 2) − 2] (8) = (λ − 1)[(λ2 − 5λ + 4] (9) = (λ − 1)(λ − 1)(λ − 4) (10) p(λ) = λ3 − 6λ2 + 9λ − 4 (11)

51. Cayley–Hamilton theorem Finding Eigenvalues EigenVectors and EigenSpaces Considering our matrix: A =   2 1 −1 1 2 −1 −1 −1 2   Finding the Eigenvalues λ1 = 1, λ2 = 1 and λ3 = 4 Finding the trace of a matrix A tr(A) = 3 X i=1 λi = 3 X i=1 aii = 6

52. Cayley–Hamilton theorem Finding Eigenvalues EigenVectors and EigenSpaces Determinant of the of a matrix A det(A) = 3 Y i=1 λi = 4

53. Cayley–Hamilton theorem Finding Eigenvalues EigenVectors and EigenSpaces Eigenvectors Considering the eigenvalues, λ1 = 1 and λ2 = 1 and λ3 = 4 and the matrix.   λ − 2 −1 1 −1 λ − 2 1 1 1 λ − 2   When λ = 1:   −1 −1 1 0 −1 −1 1 0 1 1 −1 0   Using row reduction method, we have −1 −1 1 0 We consider expressing the argument matrix in terms of equation as;

54. Cayley–Hamilton theorem Finding Eigenvalues EigenVectors and EigenSpaces −x − y + z = 0 (12) x = −y + z (13) The eigenspace Λ1 for λ = 1 becomes Λ1 =   x y z   =   −s + t s t   (14) =    s   −1 1 0   + t   1 0 1      (15) Let z = t and y = s and where t 6= 0 and s 6= 0

55. Cayley–Hamilton theorem Finding Eigenvalues EigenVectors and EigenSpaces Eigenvectors .   λ − 2 −1 1 −1 λ − 2 1 1 1 λ − 2   When λ = 4:   2 −1 1 0 −1 2 1 0 1 1 2 0   Using row reduction method, we have   2 −1 1 0 3 3 0 −3 −3 0  

56. Cayley–Hamilton theorem Finding Eigenvalues EigenVectors and EigenSpaces 2 −1 1 0 1 1 0 We consider expressing the argument matrix in terms of equation as; 2x − y + z = 0 (16) y + z = 0 (17) y = −z (18) y = −t (19) Let z = t x = −t (20)

57. Cayley–Hamilton theorem Finding Eigenvalues EigenVectors and EigenSpaces The eigenspace Λ3 for λ = 4 becomes Λ3 =   x y z   =   −t −t t   =    t   −1 −1 1      Where t 6= 0

58. Cayley–Hamilton theorem Finding Eigenvalues EigenVectors and EigenSpaces Conclusion Eigenvectors P =   −1 1 −1 1 0 −1 0 1 1   Eigenvalues D =   1 0 0 0 1 0 0 0 4   A = PDP−1

59. Cayley–Hamilton theorem Finding Eigenvalues EigenVectors and EigenSpaces End THANK YOU

Cayley-Hamilton Theorem, Eigenvalues, Eigenvectors and Eigenspace.

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Cayley-Hamilton Theorem, Eigenvalues, Eigenvectors and Eigenspace.