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ORDER
2010
2010
Sharp and Meager Elements in Orthocomplete Homogeneous Effect Algebras
We prove that every orthocomplete homogeneous effect algebra is sharply dominating. Let us denote the greatest sharp element below x by x↓. For every element x of an orthocomplete homogeneous effect algebra and for every block B with x ∈ B, the interval [x↓, x] is a subset of B. For every meager element (that means, an element x with x↓ = 0), the interval [0, x] is a complete MV-effect algebra. As a consequence, the set of all meager elements of an orthocomplete homogeneous effect algebra forms a commutative BCKalgebra with the relative cancellation property. We prove that a complete lattice ordered effect algebra E is completely determined by the complete orthomodular lattice S(E) of sharp elements, the BCK-algebra M(E) of meager elements and a mapping h : S(E) → 2M(E) given by h(a) = [0, a] ∩ M(E).
Real-time Traffic| Added | 29 Jan 2011 |
| Updated | 29 Jan 2011 |
| Type | Journal |
| Year | 2010 |
| Where | ORDER |
| Authors | Gejza Jenca |
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