Noncommutative unique factorization domain

Updated on Jan 23, 2024

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In mathematics, the noncommutative unique factorization domain is the noncommutative counterpart of the commutative or classical unique factorization domain (UFD).

Example

The ring of integral quaternions. If the coefficients a₀, a₁, a₂, a₃ are integers or halves of odd integers of a rational quaternion a = a₀ + a₁i + a₂j + a₃k then the quaternion is integral.

References

Noncommutative unique factorization domain Wikipedia

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