Abstract
We present the method for automated generation of visually dynamic presentations of plane geometry proofs based on the full-angle method. The proof generated by the full-angle method is organized hierarchically, thus it is particularly suitable for visual presentations. We also present the method for automated generation of visually dynamic presentation of proofs for the deductive database method with an additional new visual feature: given a geometrical configuration or a diagram, the final database (the fixpoint) in the deductive database method has numerous geometric properties organized into a few categories. By clicking each category, all properties of the configuration in this category are listed. And by clicking each of these properties, the corresponding geometry elements in the diagram blink or animate and, if needed, the proof of this property is generated.
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Ye, Z., Gao, X.S., Chou, S.C.: Visually dynamic presentation of proofs in plane geometry part 1. Basic features and the manual input method. J. Autom. Reason. (2009). doi:10.1007/s10817-009-9162-5
Wu, W.T.: On the decision problem and the mechanization of theorem in elementary geometry. Sci. Sin. 21, 159–172 (1978); Automated theorem proving: after 25 years. Contemp. Math.-Am. Math. Soc. 29, 213–234 (1984)
Kutzler, B., Stifter, S.: Automated geometry theorem proving using Buchberger’s algorithm. In: Proc. of SYMSAC’86, Waterloo, pp. 209–214 (1986)
Chou, S.C., Schelter, W.F.: Proving geometry theorem with rewrite rules. J. Autom. Reason. 4, 253–273 (1986)
Kapur, D.: Geometry theorem proving using Hilbert’s Nullstellensatz. In: Proc. of SYMSAC’86, Waterloo, pp. 202–208 (1986)
Collins, G.E.: Quantifier elimination for the elementary theory of real closed fields by cylindrical algebraic decomposition. In: Brakhage, H. (ed.) Automata Theory and Formal Languages. 2nd GI Conference. Lecture Notes in Computer Science, vol. 33, pp. 134–183. Springer, Berlin (1975)
Arnon, D., Mignotte, M.: On mechanical quantifier elimination for elementary algebra and geometry. J. Symb. Comput. 5, 237–259 (1988)
Collins, G.E., Hong, H.: Partial cylindrical algebraic decomposition for quantifier elimination. J. Symb. Comput. 12, 299–328 (1991)
Chou, S.C.: Mechanical Geometry Theorem Proving. D.Reidel, Dordrecht (1988)
Wu, W.T.: Basic Principles of Mechanical Theorem Proving in Geometries. Press, Beijing (in Chinese) (1984). English Version. Springer, New York (1993)
Adler, C.F.: Modern Geometry. McGraw-Hill Book, Sydney (1958)
Hilbert, D.: Foundations of Geometry, 1st edn. (in Germany) was published in 1899. Open Court, La Salla (1971)
Nevins, A.J.: Plane geometry theorem proving using forward chaining. Artif. Intell. 6(1), 1–23 (1975)
Chou, S.C., Gao, X.S., Zhang, J.Z.: A deductive database approach to automated geometry theorem proving and discovering. J. Autom. Reason. 25(3), 219–246 (2000)
Chou, S.C., Gao, X.S., Zhang, J.Z.: Automated generation of of readable proofs with geometric invariants, II. Proving theorems with full-angles. J. Autom. Reason. 17, 349–370 (1996)
Chou, S.C., Gao, X.S.: Proving geometry statements of constructive type. In: Proceedings of CADE–11. Lecture Notes in Computer Science, vol. 607, pp. 20–34. Springer, New York (1992)
Wilson, S., Fleuriot, J.D.: Combining dynamic geometry, automated geometry theorem proving, and diagrammatic proofs. In: Workshop on User Interfaces for Theorem Provers (UITP). http://www.dai.ed.ac.uk/homes/jdf/entcs-geom-05.pdf (2005)
Chou, S.C., Gao, X.S., Zhang, J.Z.: A collection of 110 geometry theorems and machine produced proofs for them, TR-94-5. CS Dept., WSU (1994)
Chou, S.C., Gao, X.S., Ye, Z.: Java geometry expert server. http://woody.cs.wichita.edu (2009) (One can run the most part of JGEX with a browser)
Chou, S.C., Gao, X.S., Ye, Z.: A collection of GIF files created with JGEX. http://woody.cs.wichita.edu/collection/index.html (2009)
Chou, S.C., Gao, X.S., Zhang, J.Z.: Machine Proofs in Geometry. World Scientific, Singapore (1994)
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The work reported here was supported by NSF Grant CCR-0201253.
Zheng Ye: On leave from ZJU and working at Wichita State University.
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Ye, Z., Chou, SC. & Gao, XS. Visually Dynamic Presentation of Proofs in Plane Geometry. J Autom Reasoning 45, 243–266 (2010). https://doi.org/10.1007/s10817-009-9163-4
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DOI: https://doi.org/10.1007/s10817-009-9163-4