On weakly Dedekind subgroups (Q581540)

The author calls an element M of a lattice V weakly Dedekind if for each element U of V the intervals [M\(\cup U/M]\) and [U/U\(\cap M]\) are isomorphic. Then he gives sufficient conditions mainly in group lattices for a weakly Dedekind element to be Dedekind, and he shows that there is a large number of groups in which each weakly Dedekind subgroup is Dedekind. He also shows that: A subgroup M of a group G is permutable if and only if M is weakly Dedekind and ascendant in G.