Abstract :
Properties of prime filters and maximal filters of transitive GE-algebras are investigated. An element-wise characterization is derived for the smallest GE-filter containing a given set. It is proved that the set of all GE-filters of a transitive GE-algebra forms a complete distributive lattice. Four different versions of a prime filter theorem are generalized in transitive GE-algebras. A necessary and sufficient condition is derived for a proper filter of a commutative GE-algebra to become a prime filter.
Keywords :
GE , algebra , GE , filter , Prime filter , Maximal filter , ∩ , closed set , Finite ∩ , structure , Commutative closed set , ∨ , closed set
