| 21. | The fundamental theorem of arithmetic continues to hold in unique factorization domains.
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| 22. | Every principal ideal domain is a unique factorization domain ( UFD ).
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| 23. | Comparison with the eigenvector factorization of "'X "'
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| 24. | These factorizations are based on early work by, and.
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| 25. | The prime factorization of 666 is 2 " 3 2 " 37.
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| 26. | The factorization step is the most computationally expensive step in the algorithm.
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| 27. | The main reason for studying these numbers is to obtain their factorizations.
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| 28. | Any square matrix A admits an " LUP " factorization.
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| 29. | This property is useful when looking for small factors in integer factorization.
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| 30. | :: And by that I mean read " Integer factorization ".
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