In “such that the canonical morphisms … are isomorphisms”, indicate which way the canonical morphisms go, and don’t use isomorphism notation for them before they have been declared to be isomorphisms.
Peter Selinger
]]>fixed the wording regarding “more generally” (ie.: pointed sets are a special case of pointed topological spaces, not the other way around)
]]>adding the category of pointed sets to the list of examples in the “Various” section
Amy Reed
]]>added pointer to:
added pointer to:
I have spelled out (here) the (utterly elementary) example of how the category of Set-indexed vector spaces is distributive monoidal with respect to the “external” tensor product.
Will add this also to VectBund.
]]>Is there any nLab standard syntax for referencing TAC articles?
I am formatting as you just did, with one slight exception: Following early suggestions by Zoran, I have adopted the habit of always displaying the code numbers that go with a webpage where a reference is hosted:
So in this case I would end the item with
([tac:28-26](http://www.tac.mta.ca/tac/volumes/28/26/28-26abs.html))
rendering to
Similarly for “doi:xyz” or “jstor:xyz” or “arXiv:xyz” or “ISBN:xyz”, etc.
Another minor thing is that I put the anchor labels right to the beginning of the paragraph that they are anchoring, instead of the end. This to avoid that the parser gets mixed up about where the anchor goes, which was a problem at least at some point.
And finally, I include the publication year in the anchor for a reference. This is to facilitate copy-and-pasting references across pages without their anchors clashing too much.
So in summary, I would code that reference as follows:
* {#Weber13} [[Mark Weber]], *Multitensors and monads on categories of enriched graphs*, [[TAC]] 28(26), 2013, ([tac:28-26](http://www.tac.mta.ca/tac/volumes/28/26/28-26abs.html))
]]>
fixed the strange reference which may not work
to
Is there any nLab standard syntax for referencing TAC articles?
]]>In the Examples-section (here) I have added mentioning of
distributive categories
pointed topological spaces (with respect to wedge sum and smash product).