At this point we have several categories of spectra that are symmetric monoidal, with their smash products descending to the smash product in the stable category; let me mention in particular the S-modules of [2] and the symmetric spectra of [3]. These categories are much more nicely behaved than any of their predecessors, but their behavior is not absolutely ideal, because it can't be. This is a theorem of Gaunce Lewis's, whose paper [4] was published before any of the current batch of symmetric monoidal categories of spectra were developed. Suppose we have a candidate for a “good” category of spectra, which we ambiguously call S. Lewis sets out the following pretty minimal list of properties for S, all of which are devoutly to be desired:

1. The category S has a symmetric monoidal product, which we call smash and write Λ, as usual.

2. […]