Nilsemigroup semigroup theory , a nilsemigroup or nilpotent semigroup Definitions Formally, a semigroup S is a nilsemigroup if:finite semigroup . A finite semigroup S is nilpotent if, equivalently:trivial semigroup of a single element is trivially a nilsemigroup.strictly upper triangular matrix , with matrix multiplication is nilpotent.bounded interval of positive real numbers . For x , y belonging to I , define as. We now show that is a nilsemigroup whose zero is n . For each natural number k , kx is equal to . For k at least equal to, kx equals n . This example generalize for any bounded interval of an Archimedean ordered semigroup.Properties A non-trivial nilsemigroup does not contain an identity element . It follows that the only nilpotent monoid is the trivial monoid .closed under taking subsemigroups closed under taking quotients closed under finite products but is not closed under arbitrary direct product . Indeed, take the semigroup, where is defined as above. The semigroup S is a direct product of nilsemigroups, however its contains no nilpotent element . variety of universal algebra . However, the set of finite nilsemigroups is a variety of finite semigroups . The variety of finite nilsemigroups is defined by the profinite equalities.
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