WELL-POINTED CATEGORY - Encyclopedia Information

From Wikipedia, the free encyclopedia

In category theory, a category with a terminal object $1$ is well-pointed if for every pair of arrows $f,g:A\to B$ such that $f\neq g$ , there is an arrow $p:1\to A$ such that $f\circ p\neq g\circ p$ . (The arrows $p$ are called the global elements or points of the category; a well-pointed category is thus one that has "enough points" to distinguish non-equal arrows.)

See also

Pointed category

References

Pitts, Andrew M. (2013). Nominal Sets: Names and Symmetry in Computer Science. Cambridge Tracts in Theoretical Computer Science. Vol. 57. Cambridge University Press. p. 16. ISBN 978-1107017788.

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From Wikipedia, the free encyclopedia

In category theory, a category with a terminal object $1$ is well-pointed if for every pair of arrows $f,g:A\to B$ such that $f\neq g$ , there is an arrow $p:1\to A$ such that $f\circ p\neq g\circ p$ . (The arrows $p$ are called the global elements or points of the category; a well-pointed category is thus one that has "enough points" to distinguish non-equal arrows.)

See also

Pointed category

References

Pitts, Andrew M. (2013). Nominal Sets: Names and Symmetry in Computer Science. Cambridge Tracts in Theoretical Computer Science. Vol. 57. Cambridge University Press. p. 16. ISBN 978-1107017788.

This category theory-related article is a stub. You can help Wikipedia by expanding it.

Retrieved from " https://en.wikipedia.org/?title=Well-pointed_category&oldid=1233347046"

Hidden category:

All stub articles

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