Nilpotent operator

ID: nilpotent-operator

In linear algebra, a nilpotent operator (or nilpotent matrix) is a linear transformation \( T \) (or a square matrix \( A \)) such that there exists a positive integer \( k \) for which \( T^k = 0 \) (the zero operator) or \( A^k = 0 \) (the zero matrix).

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