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    Distributive Lattice

    Definition

    A lattice which satisfies the identities (x⋀y)⋁(x⋀z) = x⋀(y⋁z) (x⋁y)⋀(x⋁z) = x⋁(y⋀z) is said to be distributive.

    Related terms

    lattice | modular lattice

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