Completely dissociative groupoids

Abstract

Consider arbitrarily parenthesized expressions on the k variables x0, x1, ..., xk-1, where each xi appears exactly once and in the order of their indices. We call these expressions formal k--products. Fσ(k) denotes the set of formal k--products. For u, v⊂eq Fσ(k), the claim, that u and v produce equal elements in a groupoid G for all values assumed in G by the variables xi, attributes to G a generalized associative law. Many groupoids are completely dissociative; i.e., no generalized associative law holds for them; two examples are the groupoids on 0,1 whose binary operations are implication and NAND. We prove a variety of results of that flavor.