SYMMGRP

SYMMGRP.MAX and other symbolic programs for Lie symmetry analysis of partial differential equations symmgrp.max: A Macsyma program for the calculation of Lie point symmetries of large systems of differential equations (2006). The package symmgrp.max, which is an updated version of the code written in 1991, works only under Macsyma, the commercial computer algebra system. The 1991 version of symmgrp.max (with manual) is still available at the Computer Physics Communications Program Library, Queen’s University of Belfast, North Ireland (1991).


References in zbMATH (referenced in 112 articles , 1 standard article )

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  1. Di Salvo, Rosa; Gorgone, Matteo; Oliveri, Francesco: A consistent approach to approximate Lie symmetries of differential equations (2018)
  2. Gaeta, Giuseppe: Symmetry of stochastic non-variational differential equations (2017)
  3. Kontogiorgis, Stavros; Sophocleous, Christodoulos: On the simplification of the form of Lie transformation groups admitted by systems of evolution differential equations (2017)
  4. Li, Bang-Qing; Ma, Yu-Lan; Mo, Li-Po; Fu, Ying-Ying: The $N$-loop soliton solutions for $(2+1)$-dimensional Vakhnenko equation (2017)
  5. Michels, Dominik L.; Lyakhov, Dmitry A.; Gerdt, Vladimir P.; Hossain, Zahid; Riedel-Kruse, Ingmar H.; Weber, Andreas G.: On the general analytical solution of the kinematic Cosserat equations (2016)
  6. Zhang, Zhi-Yong; Xie, Liang: Adjoint symmetry and conservation law of nonlinear diffusion equations with convection and source terms (2016)
  7. de la Rosa, R.; Gandarias, M. L.; Bruzón, M. S.: A study for the microwave heating of some chemical reactions through Lie symmetries and conservation laws (2015)
  8. Wang, Yu-Feng; Tian, Bo; Liu, Li-Cai; Li, Min; Qin, Bo: $N$-soliton solutions and asymptotic analysis for a Kadomtsev-Petviashvili-Schrödinger system for water waves (2015)
  9. Jefferson, G. F.; Carminati, J.: ASP: automated symbolic computation of approximate symmetries of differential equations (2013)
  10. Sinkala, W.; Chaisi, M.: Using Lie symmetry analysis to solve a problem that models mass transfer from a horizontal flat plate (2012)
  11. Vu, K. T.; Jefferson, G. F.; Carminati, J.: Finding higher symmetries of differential equations using the MAPLE package DESOLVII (2012)
  12. Yu, Shuimeng: $N$-soliton solutions of the KP equation by Exp-function method (2012)
  13. Bihlo, Alexander; Popovych, Roman O.: Point symmetry group of the barotropic vorticity equation (2011)
  14. B{^ı}lǎ, Nicoleta: On a new method for finding generalized equivalence transformations for differential equations involving arbitrary functions (2011)
  15. Caister, N. C.; Govinder, K. S.; O’Hara, J. G.: Optimal system of Lie group invariant solutions for the Asian option PDE (2011)
  16. Farooq, M. Umar; Ali, S.; Mahomed, F. M.: Two-dimensional systems that arise from the Noether classification of Lagrangians on the line (2011)
  17. Bluman, G.; Broadbridge, P.; King, J. R.; Ward, M. J.: Similarity: Generalizations, applications and open problems (2010)
  18. Chaolu, Temuer; Jing, Pang: An algorithm for the complete symmetry classification of differential equations based on Wu’s method (2010)
  19. Cheviakov, Alexei F.: Symbolic computation of local symmetries of nonlinear and linear partial and ordinary differential equations (2010)
  20. Edelstein, R. M.; Govinder, K. S.: Analysis of a class of potential Korteweg-de Vries-like equations (2010)

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