Abstract

Assume a finite alphabet of constant symbols and a disjoint infinite alphabet of variable symbols. A pattern is a non-null finite string of constant and variable symbols. The language of a pattern is all strings obtainable by substituting non-null strings of constant symbols for the variables of the pattern. A sample is a finite nonempty set of non-null strings of constant symbols. Given a sample S, a pattern p is descriptive of S provided the language of p contains S and does not properly contain the language of any other pattern that contains S. The computational problem of finding a pattern descriptive of a given sample is studied. The main result is a polynomial-time algorithm for the special case of patterns containing only one variable symbol (possibly occurring several times in the pattern). Several other results are proved concerning the class of languages generated by patterns and the problem of finding a descriptive pattern.

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