In this paper,a kind of graph structure of a commutative semi-group S with zero element is defined and studied.

In this paper,a new commutative semi-group is established,and the results of the papers "the Expression Form of a Commutative Semi-group"and "the Extension and Application of Commutative Semi-group" are genelized and strengthed.

Based on the number set,a new commutative semi-group is established in the integer number and extended in number fields of rational number,real number and the complex number.

Results: A series of equivalent conditions about judging p-semisimple element in BCH-algebra are given,and it proves that a commutative semigroup may be induced by a p-semisimple element in BCHalgebra.

This paper considers the structure of free product of commutative semigroups and gives the structure of their maximal semilattice quotient and Archimedean components.

In this paper,we first provide the existence theorems of fixed points for commutative semigroups of nonexpansive mappings in general Banach spaces.

Finally, it is proved that a commutative monoid can be constructed by every generalized a-associative BCH-algebra.

A self-mapping is defined in the partially ordered BCH-algebra,it is proved that a commutative monoid may be constructed by the set made in product of finite self-mappings about product of mapping,And properties of inverse elements of the commutative monoid are researched.