Proving the Spectral Theorem in Matrix Algebra

  • Thread starter Thread starter SNOOTCHIEBOOCHEE
  • Start date Start date
  • Tags Tags
    Theorem
Click For Summary
SUMMARY

The discussion centers on proving the Spectral Theorem in matrix algebra, specifically the relationship between the kernel of a square matrix A and the orthogonal complement of the image of its conjugate transpose, denoted as ker A = (im A*)⊥. Participants emphasize the need to demonstrate that the null space of A* corresponds to the null space of A. The conversation highlights the importance of understanding the properties of linear transformations and their images in this proof.

PREREQUISITES
  • Understanding of linear algebra concepts, particularly kernel and image of matrices.
  • Familiarity with the properties of conjugate transposes, specifically A*.
  • Knowledge of orthogonal complements in vector spaces.
  • Experience with proving mathematical theorems in matrix algebra.
NEXT STEPS
  • Study the properties of the kernel and image of linear transformations in detail.
  • Learn about the implications of the Spectral Theorem in matrix algebra.
  • Explore proofs involving orthogonal complements and their applications.
  • Investigate the relationship between null spaces and rank-nullity theorem.
USEFUL FOR

Students of linear algebra, mathematicians focusing on matrix theory, and educators teaching advanced algebra concepts will benefit from this discussion.

SNOOTCHIEBOOCHEE
Messages
141
Reaction score
0

Homework Statement



Prove that for any square matrix A, ker A= (im A*)\bot

Homework Equations



A* = A conjugate transpose

The Attempt at a Solution



so we want to show that all A that satisfies Ax=0 for some x, that set is equal to (im A*)\bot

But i really don't know what image of this could possibly be... we arent given a function.
 
Physics news on Phys.org
SNOOTCHIEBOOCHEE said:
But i really don't know what image of this could possibly be... we arent given a function.

it holds for any function.

prove it for any function (you should be able to)
 
So the image of the null space of A* is equal to the null space of A.

Im thinking this proof leads me in the direction that I am A* = A. then we are done. but i don't know how to show that.
 

Similar threads

Statements about linear maps | Linear Algebra
  • · Replies 8 ·
Replies
8
Views
2K
Linear Transformation and Isomorphism
  • · Replies 10 ·
Replies
10
Views
2K
Showing that the 0 matrix is the only one with rank = 0
  • · Replies 7 ·
Replies
7
Views
2K
Prove that rank(A) = rank(A^T)
  • · Replies 2 ·
Replies
2
Views
5K
Proving an image and annihilator of a kernel are equal
  • · Replies 2 ·
Replies
2
Views
4K
To prove the "##m^{\text{th}}## Powers Theorem"
  • · Replies 3 ·
Replies
3
Views
1K
Can I Use Substitution to Prove the Residue Theorem Integral?
  • · Replies 5 ·
Replies
5
Views
2K
Proving that the eigenvalues of a Hermitian matrix is real
  • · Replies 1 ·
Replies
1
Views
2K
Exercise with Linear Transformation
  • · Replies 13 ·
Replies
13
Views
2K
Person i belongs to a clique iff ith diagonal entry of B^3 is positive
  • · Replies 9 ·
Replies
9
Views
2K