The following pages link to Extremal matrix centralizers (Q1940090):
Displaying 26 items.
- On quantum groups associated to non-Noetherian regular algebras of dimension 2 (Q330006) (← links)
- Maximal and minimal triangular matrices (Q722468) (← links)
- On types of matrices and centralizers of matrices and permutations (Q741281) (← links)
- Graphs defined by orthogonality. (Q906822) (← links)
- Totally balanced and totally unimodular matrices defined by center location problems (Q1104945) (← links)
- On the centralizer of the centralizer of a matrix (Q1355241) (← links)
- Nilpotent matrices having a given Jordan type as maximum commuting nilpotent orbit (Q1743142) (← links)
- Extremal problems for the central projection (Q1928610) (← links)
- Generating systems of the full matrix algebra that contain nonderogatory matrices (Q2146541) (← links)
- The centralizer of an endomorphism over an arbitrary field (Q2174522) (← links)
- Maximal doubly stochastic matrix centralizers (Q2401299) (← links)
- Locally algebraic linear operators and their centralizers (Q2687243) (← links)
- Homomorphisms of commutativity relation (Q2805675) (← links)
- Minimal matrix centralizers over the field ℤ<sub>2</sub> (Q2926009) (← links)
- (Q3054684) (← links)
- On Centrohermitian Matrices (Q3491741) (← links)
- On the orbit of the centralizer of a matrix (Q4531925) (← links)
- A note on commutativity preserving maps on M_n(ℝ) (Q4565202) (← links)
- Extremal generalized centralizers in matrix algebras (Q4576685) (← links)
- Изометрии действительных подпространств самосопряженных операторов в банаховых симметричных идеалах (Q4970105) (← links)
- Higher-distance commuting varieties (Q5049188) (← links)
- Continuous maps on triangular matrices that preserve commutativity (Q5741240) (← links)
- (Q6052829) (← links)
- Finite topologies and their applications in linear algebra (Q6132616) (← links)
- Commutative Matrix Subalgebras Generated by Nonderogatory Matrices (Q6493788) (← links)
- Density theorems and its applications (Q6634987) (← links)
