nLab
Top

By Top is usually denoted the collection of topological spaces and continuous maps between them.

How exactly this is understood depends a bit on context: of course $\mathrm{Top}$ forms an ordinary category. But it is also naturally an (∞,1)-category. This, in turn, may be presented by regarding $\mathrm{Top}$ as a model category equipped with the Quillen model structure.

Moreover, what exactly counts as an object in $\mathrm{Top}$ often varies in different contexts. For many applications it is useful to restrict to a subcategory of nice topological spaces such as compactly generated spaces or CW-complexes.

The homotopy category of Top with respect to weak homotopy equivalences is Ho(Top). This is the central object of study in homotopy theory. Regarded as an (∞,1)-category $\mathrm{Top}$ is the archetypical homotopy theory, equivalent to ∞Grpd.