THEOREM-PROVING BY COMPUTER.
Final rept. for 1 Jan-31 Dec 64,
IIT RESEARCH INST CHICAGO ILL
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The subject is the development of efficient theoremproving algorithms, amenable to computer implementation, through the application of the theory of mathematical logic. The approach taken is via the Herbrand theorem and consists in expressing the theorem as the negation of a prefix formula of predicate calculus and of finding an inconsistent set of instances of this formula. The following problem is dealt with in searching for an inconsistent set of instances and having already generated certain instances of a formula, how can the information in the matrix of the formula be utilized to determine the most appropriate way of generating the next instance. In this regard, the idea of expressing the matrix in disjunctive normal form and generating instances so as to construct inconsistent sub-paths is considered to be a useful technique and worthy of continued study. A partial solution to the following problem is also obtained how can the information that a given disjunctive term of the matrix has figured in an inconsistent sub-path be utilized to avoid the repetition of identical computation the next time that term is encountered. A proof procedure is described which is capable of deciding certain known solvable subcases of the decision problem. It is conjectured that the procedure yield a new solvable subcase. Author