Additively irreducible sequences in commutative semigroups

Abstract

Let S be a commutative semigroup, and let T be a sequence of terms from the semigroup S. We call T an (additively) irreducible sequence provided that no sum of its some terms vanishes. Given any element a of S, let Da(S) be the largest length of the irreducible sequence such that the sum of all terms from the sequence is equal to a. In case that any ascending chain of principal ideals starting from the ideal (a) terminates in S, we found the sufficient and necessary conditions of Da(S) being finite, and in particular, we gave sharp lower and upper bounds of Da(S) in case Da(S) is finite. We also applied the result to commutative unitary rings. As a special case, the value of Da(S) was determined when S is the multiplicative semigroup of any finite commutative principal ideal unitary ring.