On the Relation between Lie Symmetries and Prolongation Structures of Nonlinear Field Equations: Non-Local Symmetries | Zendy

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On the Relation between Lie Symmetries and Prolongation Structures of Nonlinear Field Equations: Non-Local Symmetries

Author(s) -

M. Leo,

R. A. Leo,

G. Soliani,

Piergiulio Tempesta

Publication year - 2001

Publication title -

progress of theoretical physics

Language(s) - English

Resource type - Journals

eISSN - 1347-4081

pISSN - 0033-068X

DOI - 10.1143/ptp.105.77

Subject(s) - infinitesimal , homogeneous space , physics , nonlinear system , prolongation , korteweg–de vries equation , symmetry (geometry) , lie algebra , field (mathematics) , mathematical physics , operator (biology) , subalgebra , algebraic number , pure mathematics , mathematics , mathematical analysis , algebra over a field , quantum mechanics , biochemistry , chemistry , geometry , repressor , acoustics , transcription factor , gene

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