Let $x : I \times J \to X$ be a D102: Matrix.
A D102: Matrix $y : J \times I \to X$ is a transpose of $x$ if and only if
\begin{equation}
\forall \, j \in J :
\forall \, i \in I :
y_{j, i} = x_{i, j}
\end{equation}
| ▼ | Set of symbols |
| ▼ | Alphabet |
| ▼ | Deduction system |
| ▼ | Theory |
| ▼ | Zermelo-Fraenkel set theory |
| ▼ | Set |
| ▼ | Binary cartesian set product |
| ▼ | Binary relation |
| ▼ | Map |
| ▼ | Countable map |
| ▼ | Array |
| ▼ | Matrix |
| ▶ | Complex matrix antisymmetric part |
| ▶ | Complex matrix symmetric part |
| ▶ | Symmetric matrix |