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Semigroup vs Semigroud - What's the difference?

semigroup | semigroud |

In mathematics|lang=en terms the difference between semigroup and semigroud

is that semigroup is (mathematics) any set for which there is a binary operation that is both closed and associative while semigroud is (mathematics) semiheap.

As nouns the difference between semigroup and semigroud

is that semigroup is (mathematics) any set for which there is a binary operation that is both closed and associative while semigroud is (mathematics) semiheap.

semigroup

English

Noun

(wikipedia semigroup) (en noun)
  • (mathematics) Any set for which there is a binary operation that is both closed and associative.
  • * 1961 , Alfred Hoblitzelle Clifford, ?G. B. Preston, The Algebraic Theory of Semigroups (page 70)
    • If a semigroup S'' contains a zeroid, then every left zeroid is also a right zeroid, and vice versa, and the set ''K'' of all the zeroids of ''S'' is the kernel of ''S .

    Hyponyms

    * monoid * group

    semigroud

    English

    Noun

    (en noun)
  • (mathematics) semiheap