A characterization of the n-ary many-sorted closure operators and a many-sorted Tarski irredundant basis theorem

Abstract

A theorem of single-sorted algebra states that, for a closure space (A,J) and a natural number n, the closure operator J on the set A is n-ary if, and only if, there exists a single-sorted signature and a -algebra A such that every operation of A is of an arity ≤ n and J = SgA, where SgA is the subalgebra generating operator on A determined by A. On the other hand, a theorem of Tarski asserts that if J is an n-ary closure operator on a set A with n≥ 2, and if i<j with i, j∈ IrB(A,J), where IrB(A,J) is the set of all natural numbers n such that (A,J) has an irredundant basis ( minimal generating set) of n elements, such that \i+1,…, j-1\ IrB(A,J) = , then j-i≤ n-1. In this article we state and prove the many-sorted counterparts of the above theorems. But, we remark, regarding the first one under an additional condition: the uniformity of the many-sorted closure operator.