The Structure of Normal Inverse Semigroups
1956 ◽
Vol 3
(1)
◽
pp. 1-9
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In a recent paper [1] we showed that there is a (1,) -correspondence between the homomorphisms of an inverse semigroup S and its normal subsemigroups. The normal subsemigroup of S corresponding to and determining the homomorphism μ of S is the inverse image under μ of the set of idempotents of Sμ and is called the kernel of the homomorphism μ. The inverse image of each idempotent of Sμ is itself an inverse semigroup [1], and each such inverse semigroup is said to be a component of the normal subsemigroup determined by μ.
1976 ◽
Vol 17
(2)
◽
pp. 77-82
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2016 ◽
Vol 94
(3)
◽
pp. 457-463
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1978 ◽
Vol 19
(1)
◽
pp. 59-65
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Keyword(s):
2001 ◽
Vol 44
(3)
◽
pp. 549-569
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Keyword(s):
1977 ◽
Vol 18
(2)
◽
pp. 199-207
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1996 ◽
Vol 06
(05)
◽
pp. 541-551
1994 ◽
Vol 124
(1)
◽
pp. 137-147
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Keyword(s):