TY  - JOUR 
AU  - Pablos Romo, Fernando
PY  - 2024
SN  - 1081-3810
UR  - http://hdl.handle.net/10366/164043
AB  - [EN]The aim of this work is to solve the problem of determining the necessary and sufficient conditions for a vector subspace invariant by a nilpotent endomorphism to admit a complementary invariant subspace for the same linear operator. As...
LA  - eng
PB  - International Linear Algebra Society
KW  - Nilpotent endomorphism
KW  - Invariant subspace
KW  - Jordan bases
KW  - Finite potent endomorphism
KW  - Reflexive generalized inverse
TI  - Characterization of invariant subspaces for a nilpotent linear operator that admit complementary invariant subspaces
DO  - 10.13001/ela.2024.8665
T2  - The Electronic Journal of Linear Algebra
VL  - 40
M2  - 606
ER  -