On the lattice of multi-sorted relational clones on a two-element set

Abstract: We introduce a new approach to the description of multi-sorted clones (sets of $k$-tuples of operations of the same arity, closed under coordinatewise composition and containing all projection tuples) on a two-element domain. Leveraging the well-known Galois connection between operations and relations, we define a small class of \textit{canonical relations} sufficient to describe all Boolean multi-sorted clones up to non-surjective operations. Furthermore, we introduce \textit{elementary operations} on relations, which are less cumbersome than general formulas and have many useful properties. Using these tools, we provide a~new and elementary proof of the famous Post's lattice theorem. We also show that every multi-sorted clone of $k$-tuples of operations decomposes into a surjective part described by canonical relations and $2k$ clones of $(k-1)$-tuples of operations. This structural understanding allows us to describe an embedding of the lattice of multi-sorted clones into a well-understood poset. In particular, we rederive -- by a simpler method -- a~result of V.~Taimanov originally from 1983, showing that every multi-sorted clone on a two-element domain is finitely generated. Finally, we also give a~concise proof of the Galois connection between (surjective) multi-sorted clones and the corresponding closed sets of relations.