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Are there constructive examples forof doubly stochastic matrices (whose rows and columns all sum up to 1$1$ and contain only non-negative entries) whichthat are not diagonalizable?
Non-Diagonalizable Doubly Stochastic Matrices
Are there constructive examples for doubly stochastic matrices (whose rows and columns all sum up to 1 and contain only non-negative entries) which are not diagonalizable?
Non-diagonalizable doubly stochastic matrices
Are there constructive examples of doubly stochastic matrices (whose rows and columns all sum up to $1$ and contain only non-negative entries) that are not diagonalizable?
Are there constructive examples for doubly stochastic matrices (whose rows and columns all sum up to 1 and contain only non-negative entries) which are not diagonizablediagonalizable?
Non-Diagonizable Doubly Stochastic Matrices
Are there constructive examples for doubly stochastic matrices (whose rows and columns all sum up to 1 and contain only non-negative entries) which are not diagonizable?
Non-Diagonalizable Doubly Stochastic Matrices
Are there constructive examples for doubly stochastic matrices (whose rows and columns all sum up to 1 and contain only non-negative entries) which are not diagonalizable?
changed title from diagonizable to non-diagonizable
