Closed sets of finitary functions between products of finite fields of coprime order

Abstract

We investigate the finitary functions from a finite product of finite fields Πj =1mFqj = K to a finite product of finite fields Πi =1nFpi = F, where |K| and |F| are coprime. An (F,K)-linearly closed clonoid is a subset of these functions which is closed under composition from the right and from the left with linear mappings. We give a characterization of these subsets of functions through the Fp[K×]-submodules of FpK, where K× is the multiplicative monoid of K = Πi=1mFqi. Furthermore we prove that each of these subsets of functions is generated by a set of unary functions and we provide an upper bound for the number of distinct (F,K)-linearly closed clonoids.