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Completions of semilattices of cancellative semigroups
Published online by Cambridge University Press: 18 May 2009
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K. Shoji has pointed out to me that construction [1] does not always yield a completion. In the notation of [1], the homomorphism from the strong semilattice of cancellative semigroups S to its purported completion T in Abian's order is not always a monomorphism. The difficulty arises when there is eɛ E, e=sup{e'ɛEe'<e>e} but {‐e,e'}e' is not faithful, i.e. there are x, y with x¬y in Se such that φe,e'(x)=φe,e'(y) for all e'<e. A modification of the construction saves all parts of Theorem 1 except the fact that the new embedding S⊆T need not preserve suprema existing in S; it does if S is a semilattice of groups. The sequel [2] also needs amodification in the form of an additional hypothesis.
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- Copyright © Glasgow Mathematical Journal Trust 1985
References
REFERENCE
Burgess, W. D., Completions of semilattices of cancellative semigroups, Glasgow Math J. 21 (1980), 29–37.Google Scholar
Burgess, W. D., The injective hull of S-sets, S a semilattice of groups, Semigroup Forum 23 (1981), 241–246.Google Scholar
Johnson, C. S. Jr, and Mcmorris, F. R., Non-singular semilattices and semigroups, Czechoslovak Math J. 26 (1976), 280–282.Google Scholar
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