Drazin inverse

In mathematics, the Drazin inverse, named after Michael P. Drazin, is a kind of generalized inverse of a matrix.
Let A be a square matrix. The index of A is the least nonnegative integer k such that rank = rank. The Drazin inverse of A is the unique matrix A^D which satisfies
It's not a generalized inverse in the classical sense, since in general.

If A is invertible with inverse, then.
The Drazin inverse of a matrix of index 0 or 1 is called the group inverse or -inverse and denoted A^#. The group inverse can be defined, equivalently, by the properties AA^#A = A, A^#AA^# = A^#, and AA^# = A^#A.
A projection matrix P, defined as a matrix such that P² = P, has index 1 and has Drazin inverse P^D = P.
If A is a nilpotent matrix, then

The hyper-power sequence is
For or any regular with chosen such that the sequence tends to its Drazin inverse,

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