Călugăreanu, Grigore Cocompact lattices. (English) Zbl 0855.06007 Math. Pannonica 7, No. 2, 185-190 (1996). Summary: A lattice \(L\) is called cocompact if its dual \(L^0\) is compact. If \(M\) is an \(R\)-module, the lattice \(S_R (M)\) of all the submodules of \(M\) is cocompact iff \(M\) is finitely cogenerated. Most of the properties of these modules are proved in the general lattice setting. MSC: 06C05 Modular lattices, Desarguesian lattices 06C20 Complemented modular lattices, continuous geometries Keywords:reducible lattices; pseudocomplement; superfluous elements; socle; radical; cocompact lattices; algebraic lattices; lattice of submodules; modules PDFBibTeX XMLCite \textit{G. Călugăreanu}, Math. Pannonica 7, No. 2, 185--190 (1996; Zbl 0855.06007) Full Text: EuDML