What is the relationship between rank and submatrices in a nonzero matrix?

  • Context: Graduate 
  • Thread starter Thread starter Grothard
  • Start date Start date
  • Tags Tags
    rank Theorem
Grothard
Messages
26
Reaction score
0
Let A be a nonzero matrix of size n. Let a k*k submatrix of A be defined as a matrix obtained by deleting any n-k rows and n-k columns of A. Let m denote the largest integer such that some m*m submatrix has a nonzero determinant. Then rank(A) = k.

Conversely suppose that rank(A) = m. There exists a m*m submatrix has a nonzero determinant.



I'm currently trying to prove this theorem. Not quite sure if I should proceed by examining the solution space of A or rather just do something clever with the determinants. I feel like there's a property of determinants that I'm missing that'd make this much easier.
 
Physics news on Phys.org
If the determinant is non-zero, that implies that the columns are linearly independent. Remember, the determinant measures the (hyper-)volume of the parallelepiped spanned by the columns. Intuitively, a non-zero volume implies linear independence. I would use that.

So, you have a square submatrix whose columns are linearly independent. What does that tell you about the corresponding columns in the bigger matrix A?
 
some things to think about:

if you use row-reduction to find rank(A), how does each row-operation affect the determinant?

if you think of the determinant as a function of n n-vectors, instead of an nxn matrix, is it linear in each variable? how does this tie into dim(row(A)) = dim(col(A))?

does re-arranging rows or columns of a matrix change its determinant?
 

Similar threads

  • · Replies 4 ·
Replies
4
Views
4K
  • · Replies 3 ·
Replies
3
Views
2K
  • · Replies 5 ·
Replies
5
Views
2K
  • · Replies 15 ·
Replies
15
Views
5K
  • · Replies 1 ·
Replies
1
Views
2K
  • · Replies 1 ·
Replies
1
Views
3K
  • · Replies 3 ·
Replies
3
Views
3K
  • · Replies 17 ·
Replies
17
Views
8K
  • · Replies 8 ·
Replies
8
Views
6K
  • · Replies 3 ·
Replies
3
Views
13K