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The generalized Chinese remainder theorem for universal algebras; subdirect factorization

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References

  1. Foster, A. L.: Generalized “Boolean” theory of universal algebras, Part I: Subdirect sums and normal representation theorem. Math. Z.58, 306–336 (1953).

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  2. Foster, A. L.: Generalized “Boolean” theory of universal algebras, Part II: Identities and subdirect sums of functionally complete algebras. Math. Z.59, 191–199 (1953).

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  3. Foster, A. L.: The identities of—and unique subdirect factorization within—classes of universal algebras. Math. Z.62, 171–188 (1955).

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  4. Foster, A. L.: Ideals and their structure in classes of operational algebras. Math. Z.65, 70–75 (1956). -Additional references may be found in the bibliographies of the above papers.

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Authors and Affiliations

  1. University of California, Berkeley

    Alfred L. Foster

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  1. Alfred L. Foster
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Foster, A.L. The generalized Chinese remainder theorem for universal algebras; subdirect factorization. Math Z 66, 452–469 (1956). https://doi.org/10.1007/BF01186622

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  • DOI: https://doi.org/10.1007/BF01186622

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