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The article spectrum claims that "There is a stabilized Dold-Kan correspondence that identifies these with special objects in Sp(Top)." The formula that follows this statement seems to imply that the stabilized Dold-Kan correspondence works with chain complexes that are unbounded in both directions. What is the reference for this type of Dold-Kan correspondence?
I’m going to hope someone else has a good answer to your question, but just FYI, on the nForum you can type [[spectrum]] and it will automatically produce a link to the appropriate nLab page spectrum, as long as you select the radio button “Markdown+Itex” below the input box.
@Mike: Thanks, I fixed it.
The entry discussing this is at module spectrum in the section Stable Dold-Kan correspondence.
I am adding the missing pointers to that entry now to spectrum and to Dold-Kan correspondence.
@Urs: Thanks a lot!
Sounds very good. Do you feel like adding comments to this extent to one of the relevant entries?
I added a new section on the stable Dold-Kan correspondence to Dold-Kan correspondence.
I am now not at all sure if we should also refer to the theorem that establishes an equivalence of ∞-categories between HZ-modules and chain complexes as the Dold-Kan correspondence. This statement doesn't seem to be related in any way to the original results of Dold and Kan. Any suggestions on how to resolve this terminological problem?
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