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An algorithm to generate the basis of solutions to homogeneous linear Diophantine equations. (English) Zbl 0377.10011

11D04 Linear Diophantine equations
68T15 Theorem proving (deduction, resolution, etc.) (MSC2010)
Full Text: DOI
[1] Clifford, A.H.; Presto, G.B.; Clifford, A.H.; Preston, G.B., The algebraic theory of semigroups, American mathematical society, American mathematical society, Vol. II, (1967) · Zbl 0178.01203
[2] Stickel, M.E., A complete unification algorithm for associative-comunitative functions, Proceedings of the 4th international joint conference on artificial intelligence, (1975), Tbilisi
[3] M. Livesey and J. Siekmann, Unification of A + C-terms (bags) and A + C + I-terms (sets), Interner Bericht Nr. 3/76, Institut für Iformatik I, Universität Karlstuhe.
[4] Huet, G., An algorithm to generate the basis of solutios homogenoeus linear Diophantine equations, Rapport laboratoria no. 274, (1978), IRIA
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