Pages that link to "Item:Q503414"

The following pages link to Each \(2n\)-by-\(2n\) complex symplectic matrix is a product of \(n+1\) commutators of \(J\)-symmetries (Q503414):

Displaying 9 items.

• Each symplectic matrix is a product of four symplectic involutions (Q472445) (← links)
• Every \(2n\)-by-\(2n\) complex matrix is a sum of three symplectic matrices (Q503427) (← links)
• The \(J\)-Householder matrices (Q665939) (← links)
• On the \(\phi_J\) polar decomposition of matrices (Q847206) (← links)
• Products of symplectic normal matrices (Q1698595) (← links)
• The subspaces spanned by Householder vectors associated with an orthogonal or a symplectic matrix (Q1743130) (← links)
• Every real symplectic matrix is a product of real symplectic involutions (Q2174471) (← links)
• Decomposition of symplectic matrices into products of symplectic unipotent matrices of index 2 (Q5215569) (← links)
• Every real symplectic matrix is a product of commutators of real symplectic involutions (Q5865501) (← links)