Every matrix represents a linear transformation, but depending on characteristics of the matrix, the linear transformation it represents can be limited to a specific type. For example, an orthogonal matrix represents a rotation (and possibly a reflection). Is it something similar about triangular matrices? Do they represent any specific type of transformation?

tamola7f

tamola7f

Answered question

2022-09-13

Every matrix represents a linear transformation, but depending on characteristics of the matrix, the linear transformation it represents can be limited to a specific type. For example, an orthogonal matrix represents a rotation (and possibly a reflection). Is it something similar about triangular matrices? Do they represent any specific type of transformation?

Answer & Explanation

lilhova13b3

lilhova13b3

Beginner2022-09-14Added 12 answers

Remember that the columns of a matrix are the images of a basis under the linear map that the matrix represents. The simplest observation for a triangular matrix is that the image of the 𝑛-h basis vector is in the span of the first 𝑛 basis vectors. So, the first vector gets mapped to somewhere on the line it generates, the second vector gets mapped into the plane generated by the first two vectors, and so on.
spremani0r

spremani0r

Beginner2022-09-15Added 3 answers

For complex matrices, the Schur Theorem tells you that any matrix is unitarily equivalent to an upper triangular matrix. So, in a sense, all matrices are upper triangular.
Similarly, in the complex case, any nilpotent matrix can be represented by a strictly upper triangular matrix. So the strictly upper triangular matrices represent nilpotent matrices.

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