LATTICE UNIVERSALITY OF LOCALLY FINITE \(p\)-GROUPS
Abstract
For an arbitrary prime \(p\), we prove that every algebraic lattice is isomorphic to a complete sublattice in the subgroup lattice of a suitable locally finite \(p\)-group. In particular, every lattice is embeddable in the subgroup lattice of a locally finite \(p\)-group.
Keywords
Subgroup lattice, Algebraic lattice, Complete sublattice, Lattice-universal class of algebras, Locally finite \(p\)-group, Group valuation.
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