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PDF Availablehttps://doi.org/10.1017/s1446788700036867
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Cite Publication Date: Oct 1, 2007 | |
 Citations: 9 |
AbstractWe prove that every for every complete lattice-ordered effect algebra E there exists an orthomodular lattice O(E) and a surjective full morphism øE: O(E) → E which preserves blocks in both directions: the (pre)imageofa block is always a block. Moreover, there is a 0, 1-lattice embedding : E → O(E).
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