Permutation clones that preserve relations

Permutation clones generalise permutation groups and clone theory. We investigate permutation clones defined by relations, or equivalently, the automorphism groups of powers of relations. We find many structural results on the lattice of all relationally defined permutation clones on a finite set. We find all relationally defined permutation clones on two element set. We show that all maximal borrow closed permutation clones are either relationally defined or cancellatively defined. Permutation clones generalise clones to permutations of $A^n$. Emil Je\v{r}\'{a}bek found the dual structure to be weight mappings $A^k\rightarrow M$ to a commutative monoid, generalising relations. We investigate the case when the dual object is precisely a relation, equivalently, that $M={\mathbb B}$, calling these relationally defined permutation clones. We determine the number of relationally defined permutation clones on two elements (13). We note that many infinite classes of clones collapse when looked at as permutation clones.