Exact Learning of Multivalued Dependencies
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Fecha
2015-10-31Autor
Hermo Huguet, Montserrat
Ozaki, Ana
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International Conference on Algorithmic Learning Theory : 73-88 (2015)
Resumen
The transformation of a relational database schema into the fourth normal form, which minimizes data redundancy, relies on the correct identification of multivalued dependencies. In this work, we study
the learnability of multivalued dependency formulas (MVDF), which correspond to the logical theory behind multivalued dependencies. As we explain, MVDF lies between propositional Horn and 2-Quasi-Horn. We prove that MVDF is polynomially learnable in Angluin et al.’s exact learning model with membership and equivalence queries, provided that counterexamples and membership queries are formulated as 2-Quasi-
Horn clauses. As a consequence, we obtain that the subclass of 2-Quasi-Horn theories which are equivalent to MVDF is polynomially learnable.