Let $X = \prod_{j \in J} X_j$ be a D326: Cartesian product.
The canonical projection on $X$ with respect to $i \in J$ is the D18: Map
\begin{equation}
X \to X_i, \quad
\{ x_j \}_{j \in J} \mapsto x_i
\end{equation}
| ▼ | Set of symbols |
| ▼ | Alphabet |
| ▼ | Deduction system |
| ▼ | Theory |
| ▼ | Zermelo-Fraenkel set theory |
| ▼ | Set |
| ▼ | Binary cartesian set product |
| ▼ | Binary relation |
| ▼ | Map |
| ▼ | Cartesian product |
| ▶ | Element in countable cartesian product iff components in images of canonical projections |
| ▶ | Element in finite cartesian product iff components in images of canonical projections |