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The semijoin algebra and the guarded fragment
Journal of Logic, Language and Information 14 (3):331-343 (2005)
Abstract
In the 1970s Codd introduced the relational algebra, with operators selection, projection, union, difference and product, and showed that it is equivalent to first-order logic. In this paper, we show that if we replace in Codd’s relational algebra the product operator by the “semijoin” operator, then the resulting “semijoin algebra” is equivalent to the guarded fragment of first-order logic. We also define a fixed point extension of the semijoin algebra that corresponds to μGF.Links
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References found in this work
Modal Languages and Bounded Fragments of Predicate Logic.Hajnal Andréka, István Németi & Johan van Benthem - 1998 - Journal of Philosophical Logic 27 (3):217 - 274.
On the restraining power of guards.Erich Grädel - 1999 - Journal of Symbolic Logic 64 (4):1719-1742.
The effect of bounding the number of primitive propositions and the depth of nesting on the complexity of modal logic.Joseph Y. Halpern - 1995 - Artificial Intelligence 75 (2):361-372.
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