An endomorphism on an algebra A is said to be strong if it is compatible with every congruence on A.If every congruence on A,other than the universal congruence,is the kernel of a strong endomorphism on A,then A is sa...An endomorphism on an algebra A is said to be strong if it is compatible with every congruence on A.If every congruence on A,other than the universal congruence,is the kernel of a strong endomorphism on A,then A is said to have the strong endomorphism kernel property.In this paper,we shall give a complete description of the structure of those symmetric extended MS-algebras that have this property via Priestley duality.展开更多
文摘An endomorphism on an algebra A is said to be strong if it is compatible with every congruence on A.If every congruence on A,other than the universal congruence,is the kernel of a strong endomorphism on A,then A is said to have the strong endomorphism kernel property.In this paper,we shall give a complete description of the structure of those symmetric extended MS-algebras that have this property via Priestley duality.
