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An Implementation for the Algorithm of Janet bases of Linear Differential Ideals in the Maple System

An Implementation for the Algorithm of Janet bases of Linear Differential Ideals in the Maple System
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摘要 In this paper, an algorithm for computing the Janet bases of linear differential equations is described, which is the differential analogue of the algorithm JanetBasis improved by Gerdt. An implementation of the algorithm in Maple is given. The implemented algorithm includes some subalgorithms: Janet division, Pommaret division, the judgement of involutive divisor and reducible, the judgement of conventional divisor and reducible, involutive normal form and conventional normal form, involutive autoreduction and conventional autoreduction, PJ-autoreduction and so on. As an application, the Janet Bases of the determining system of classical Lie symmetries of some partial differential equations are obtained using our package. In this paper, an algorithm for computing the Janet bases of linear differential equations is described, which is the differential analogue of the algorithm JanetBasis improved by Gerdt. An implementation of the algorithm in Maple is given. The implemented algorithm includes some subalgorithms: Janet division, Pommaret division, the judgement of involutive divisor and reducible, the judgement of conventional divisor and reducible, involutive normal form and conventional normal form, involutive autoreduction and conventional autoreduction, PJ-autoreduction and so on. As an application, the Janet Bases of the determining system of classical Lie symmetries of some partial differential equations are obtained using our package.
作者 Shan-qingZhang Zhi-binLi
机构地区 DepartmentofComputerScience
出处 《Acta Mathematicae Applicatae Sinica》 SCIE CSCD 2004年第4期605-616,共12页 应用数学学报(英文版)
关键词 Involutive bases Janet bases Gr&#246 bner bases symbolic computation and algebraic computation partial differential equations Involutive bases Janet bases Gr&#246 bner bases symbolic computation and algebraic computation partial differential equations
分类号 O175.2 [理学—基础数学]
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参考文献15

  • 1Apel, J. Theory of Involutive Divisions and an Application to Hilbert Function. J. Symb. Comp., 25:683-704 (1998)
  • 2Becker, T., Weispfenning, V., Kredel, H. Gr6bner Bases A computional approach to commutative algebra.Springer-Verlag, New York, 1993
  • 3Bluman, G., Kumei, S. Symmetries and differential equations. Springer-Verlag, New York, 1989
  • 4Chen, Y.F., Gao, X.S. Involutive directions and new involutive divisions. Comp. Math. Appl., 41:945-956(2001)
  • 5Gerdt, V.P., Blinkov Yu A. Involutive Bases of Polynomial Ideals. Math. Comp. Simul., 45:519-542(1998)
  • 6Gerdt, V.P., Blinkov Yu A. Minimal Involutive Bases. Math. Comp. Simul., 45:543-560 (1998)
  • 7Gerdt, V.P. Completion of linear differential systems to involution [A]. Victor G Ganzha, Ernst W Mayr,Evgenii V Vorozhtsov (eds.). Computer Algebra in scientific Computing/CASC'99. Springer-Verlag, Berlin,1999
  • 8Gerdt, V.P. On the relation between Pommaret and Janet Bases.http : //arxiv.org/PScache/math/pdf/0004/0004100.pdf, 2000 - 04 - 15
  • 9Olver, P.J. Applications of Lie groups to differential equations. 2nd ed. Springer-Verlag, New York, 1993
  • 10Pommaret, J.F. Partial differential equations and group theory. New perspectives for applications. Kluwer,Dordrecht, 1994
Acta Mathematicae Applicatae Sinica
2004年 第4期

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