Abstract. The problem of giving a succinct description of multiplicative structure on spectra was recognized almost as soon as the idea of a spectrum was formulated. This paper aims to describe the major features of the historical precursors to the S-module approach of [2]. In particular, we consider the purely homotopical notion of a ring spectrum, May's concepts of external smash product and its internalization, the Lewis-May twisted half-smash product, and this product's use in formulating May and Quinn's notion of an E∞ ring spectrum. We then describe how three essentially trivial (but crucial) observations led to the idea of an v-spectrum, and soon thereafter to S-modules. We conclude by describing the good formal and homotopical properties of the category of S-modules.