In mathematics, the category of compactly generated weak Hausdorff spaces, CGWH, is a category used in algebraic topology as an alternative to the category of topological spaces, Top, as the latter lacks some properties that are common in practice and often convenient to use in proofs. There is also such a category for the CGWH analog of pointed topological spaces, defined by requiring maps to preserve base points.
The articles compactly generated space and weak Hausdorff space define the respective topological properties. For the historical motivation behind these conditions on spaces, see Compactly generated space#Motivation. This article focuses on the properties of the category.
CGWH has the following properties:
\operatorname{Map}(X,Y)
YX
\operatorname{Map}(X x Y,Z)\simeq\operatorname{Map}(X,\operatorname{Map}(Y,Z))
that is natural in X, Y, and Z. In short, the category is Cartesian closed in an enriched sense.
(X,*)
(Y,\circ)
\operatorname{Map}((X,*),(Y,\circ))
(X,*)
(Y,\circ)
(X,*)
(Y,\circ)
(X,*)
(Y,\circ)
(Z,\star)
\operatorname{Map}((X,*)\wedge(Y,\circ),(Z,\star))\simeq\operatorname{Map}((X,*),\operatorname{Map}((Y,\circ),(Z,\star)))
that is natural in
(X,*)
(Y,\circ)
(Z,\star)