A classic result in semigroup theory due to D. B. McAlister states that every inverse semigroup has an E-unitary cover; besides being surjective, the homomorphism in this case is also idempotent separating, meaning that in its kernel an idempotent and non-idempotent never belong to the same equivalence class.; something slightly stronger has actually be shown for inverse semigroups: every inverse semigroup admits an F-inverse cover.^[1] McAlister's covering theorem generalizes to orthodox semigroups: every orthodox semigroup has a unitary cover.^[2]

Examples from other areas of algebra include the Frattini cover of a profinite group^[3] and the universal cover of a Lie group.

If F is some family of modules over some ring R, then an F-cover of a module M is a homomorphism X→M with the following properties:

• X is in the family F
• X→M is surjective
• Any surjective map from a module in the family F to M factors through X
• Any endomorphism of X commuting with the map to M is an automorphism.

In general an F-cover of M need not exist, but if it does exist then it is unique up to (non-unique) isomorphism.

Examples include:

• Projective covers (always exist over perfect rings)
• flat covers (always exist)
• torsion-free covers (always exist over integral domains)
• injective covers

• Embedding

• Howie, John M. (1995). Fundamentals of Semigroup Theory. Clarendon Press. ISBN 0-19-851194-9.