Understanding Block Diagonal Matrices in Finite-Dimensional Spaces π
Learn how every linear operator on a finite-dimensional complex vector space can be represented as a block diagonal matrix, simplifying analysis and computations.
Sheldon Axler
29.2K views β’ May 21, 2017
About this video
Every operator on a finite-dimensional complex vector space has a matrix (with respect to some basis of the vector space) that is a block diagonal matrix, with each block itself an upper-triangular matrix that contains only one eigenvalue on the diagonal.
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Views
29.2K
Likes
223
Duration
4:32
Published
May 21, 2017
User Reviews
4.2
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