Endomorphism/Nilpotent/Definition
Nilpotent endomorphism
Let be a field, and let be a -vector space. A linear mapping
is called nilpotent, if there exists a natural number such that the -th composition fulfills
Let be a field, and let be a -vector space. A linear mapping
is called nilpotent, if there exists a natural number such that the -th composition fulfills