Projection (set theory) - Misplaced Pages

In set theory, a projection is one of two closely related types of functions or operations, namely:

A set-theoretic operation typified by the $j$ projection map, written $\mathrm {proj} _{j},$ that takes an element ${\vec {x}}=(x_{1},\ \dots ,\ x_{j},\ \dots ,\ x_{k})$ of the Cartesian product $(X_{1}\times \cdots \times X_{j}\times \cdots \times X_{k})$ to the value $\mathrm {proj} _{j}({\vec {x}})=x_{j}.$
A function that sends an element $x$ to its equivalence class under a specified equivalence relation $E,$ or, equivalently, a surjection from a set to another set. The function from elements to equivalence classes is a surjection, and every surjection corresponds to an equivalence relation under which two elements are equivalent when they have the same image. The result of the mapping is written as $[x]$ when $E$ is understood, or written as $_{E}$ when it is necessary to make $E$ explicit.

References

Halmos, P. R. (1960), Naive Set Theory, Undergraduate Texts in Mathematics, Springer, p. 32, ISBN 9780387900926.
Brown, Arlen; Pearcy, Carl M. (1995), An Introduction to Analysis, Graduate Texts in Mathematics, vol. 154, Springer, p. 8, ISBN 9780387943695.
Jech, Thomas (2003), Set Theory: The Third Millennium Edition, Springer Monographs in Mathematics, Springer, p. 34, ISBN 9783540440857.

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