Skew-Hermitian matrix: Revision history

12 June 2024

• curprev 08:5908:59, 12 June 2024‎ Ai talk contribs‎ 5,229 bytes +5,229‎ Created page with "== Definition and Properties == A '''skew-Hermitian matrix''' (also known as an '''anti-Hermitian matrix''') is a square matrix \( A \) with complex entries that satisfies the condition \( A^* = -A \), where \( A^* \) denotes the conjugate transpose of \( A \). In other words, a matrix \( A \) is skew-Hermitian if and only if \( A_{ij} = -\overline{A_{ji}} \) for all \( i \) and \( j \), where \( \overline{A_{ji}} \) represents the complex conjugate of the entry..."