Linear algebra (Osnabrück 2024-2025)/Part I/Exercise sheet 12



Exercise for the break

Prove that the elementary matrices are invertible. What are the inverse matrices of the elementary matrices?




Exercises

Show that an invertible matrix neither has a zero row nor a zero column.


Let be an -matrix such that there exist -matrices satisfying and . Show that holds, and that is invertible.


Let and be invertible -matrices. Show that also is invertible, and that

holds.


Let be a field and let and be vector spaces over of dimensions and . Let

be a linear map, described by the matrix with respect to two bases. Prove that is surjective if and only if the columns of the matrix form a system of generators for .


Let be a field and a -matrix with entries in . Prove that the multiplication by the elementary matrices from the left with M has the following effects.

  1. exchange of the -th and the -th row of .
  2. multiplication of the -th row of by .
  3. addition of -times the -th row of to the -th row ().


Describe what happens when a matrix is multiplied from the right by an elementary matrix.


  1. Transform the matrix equation

    into a system of linear equations.

  2. Solve this linear system.


Let and be matrices over a field such that

holds. Show directly that

holds as well.


Determine the inverse matrix of


Determine the inverse matrix of


Determine the inverse matrix of


Determine the inverse matrix of the complex matrix



a) Determine if the complex matrix

is invertible.


b) Find a solution to the inhomogeneous linear system of equations


Perform, for the matrix

the inverting algorithm, until it is obvious that the matrix is not invertible.


Let

Find elementary matrices such that is the identity matrix.


Determine explicitly the column rank and the row rank of the matrix

Describe linear dependencies (if they exist) between the rows and between the columns of the matrix.


Show that the elementary operations on the rows do not change the column rank.


Let be an -matrix and the corresponding linear mapping. Show that is surjective if and only if there exists an -matrix such that .


Let be an -matrix, and let be an -matrix. Show that, for the column rank, the estimate

holds.


Let be an -matrix, and let be an invertible -matrix. Show that, for the column rank, the equality

holds.


A block matrix is an -matrix of the form

where is an -matrix, is an -matrix, is an -matrix and is an -matrix.

Let a block matrix of the form

be given. Show that the rank of equals the sum of the ranks of and of .




Hand-in-exercises

Exercise (3 marks)

Compute the inverse matrix of


Exercise (4 marks)

Determine the inverse matrix of the complex matrix


Exercise (4 marks)

Let

Find elementary matrices such that is the identity matrix.


Exercise ( marks)

Prove that the matrix

for all is the inverse of itself.


Exercise (3 marks)

Perform the procedure to find the inverse matrix of the matrix

under the assumption that .


Exercise (3 marks)

Let be a field, and let and be vector spaces over of dimensions and . Let

be a linear map, described by the matrix with respect to two bases. Prove that



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