Nilpotent Matrix A matrix A for which AP=0 where P is a positive integer is called nilpotent matrix. If P is the least positive integer for which AP=0 then A is said to be nilpotent of index P.

Gilbert Baumslag has written:

'Calculus'

'A universal approach to groups and rings' -- subject(s): Group theory, Rings (Algebra), Universal Algebra

'Lecture notes on nilpotent groups' -- subject(s): Nilpotent groups

D. A. Suprunenko has written:

'Soluble and nilpotent linear groups'

Richard Tolimieri has written:

'Theory of nilpotent groups' -- subject(s): Polynomials

Olive C. Hazlett has written:

'On the classification and invariantive characterization of nilpotent algebras ..' -- subject(s): Universal Algebra