论文信息 - Empirical explorations of the geometry theorem machine

Empirical explorations of the geometry theorem machine

In early spring, 1959, an IBM 704 computer, with the assistance of a program comprising some 20 000 individual instructions, proved its first theorem in elementary Euclidean plane geometry. Since that time, the geometry theorem-proving machine (a particular state configuration of the IBM 704 specified by the afore-mentioned machine code) has found solutions to a large number of problems taken from high school textbooks and final examinations in plane geometry. Some of these problems would be considered quite difficult by the average high school student. In fact, it is doubtful whether any but the brightest students could have produced a solution for any of the latter group when granted the same amount of prior "training" afforded the geometry machine (i.e., the same vocabulary of geometric concepts and the same stock of previously proved theorems).

D. Loveland | H. Gelernter | J. Hansen

[1] J. C. Shaw,et al. Programming the logic theory machine , 1899, IRE-AIEE-ACM '57 (Western).

[2] Nathaniel Rochester,et al. Intelligent Behavior in Problem-Solving Machines , 1958, IBM J. Res. Dev..

[3] H. Gelernter,et al. A Note on Syntactic Symmetry and the Manipulation of Formal Systems by Machine , 1959, Inf. Control..

[4] H. Gelernter,et al. Realization of a geometry theorem proving machine , 1995, IFIP Congress.

[5] H. Gelernter,et al. A FORTRAN-compiled list-processing language , 1959, ACM '59.

[6] Allen Newell,et al. Report on a general problem-solving program , 1959, IFIP Congress.

[7] Hao Wang,et al. Toward Mechanical Mathematics , 1960, IBM J. Res. Dev..

[8] Paul C. Gilmore,et al. A Proof Method for Quantification Theory: Its Justification and Realization , 1960, IBM J. Res. Dev..