Order Topology and Frink Ideal Topology of Effect Algebras

Abstract

In this paper, the following results are proved: (1) If E is a complete atomic lattice effect algebra, then E is (o)-continuous iff E is order-topological iff E is totally order-disconnected iff E is algebraic. (2) If E is a complete atomic distributive lattice effect algebra, then its Frink ideal topology τid is Hausdorff topology and τid is finer than its order topology τo, and τid=τo iff 1 is finite iff every element of E is finite iff τid and τo are both discrete topologies. (3) If E is a complete (o)-continuous lattice effect algebra and the operation is order topology τo continuous, then its order topology τo is Hausdorff topology. (4) If E is a (o)-continuous complete atomic lattice effect algebra, then is order topology continuous.