K(G,1) can be defined as the type of G-torsors, and addition corresponds to taking the tensor product (in the obvious way). So what's the multiplication when G is a ring?
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@trebor I'm confused. Addition in G is loop concatenation in K(G, 1). What does that have to do with tensor products?
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@ncf There is a unique map K(G,1)^2 -> K(G,1) such that the action on the loop space is addition in G
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