Soliton Solutions of Q-Toda Lattice by Hirota Direct Method
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Date
2012
Authors
Silindir, Burcu
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Springeropen
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GOLD
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Abstract
This paper presents the q-analogue of Toda lattice system of difference equations by discussing the q-discretization in three aspects: differential-q-difference, q-difference-q-difference and q-differential-q-difference Toda equation. The paper develops three-q-soliton solutions, which are expressed in the form of a polynomial in power functions, for the differential-q-difference and q-difference-q-difference Toda equations by Hirota direct method. Furthermore, it introduces q-Hirota D-operator and presents the q-differential-q-difference version of Toda equation. Finally, the paper presents its solitary wave like a solution in terms of q-exponential function and explains the nonexistence of further solutions in terms of q-exponentials by the virtue of Hirota perturbation.
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Keywords
Hirota direct method, q-Toda lattice, q-soliton solutions, q-exponential identity, q-Hirota D-operator, De-Vries Equation, Multiple Collisions, Algebra and Number Theory, Applied Mathematics, Analysis, \(q\)-exponential identity, Hirota direct method, Soliton solutions, \(q\)-soliton solutions, \(q\)-Toda lattice, Completely integrable infinite-dimensional Hamiltonian and Lagrangian systems, integration methods, integrability tests, integrable hierarchies (KdV, KP, Toda, etc.), \(q\)-Hirota \(D\)-operator, Lattice functional-differential equations
Fields of Science
0103 physical sciences, 01 natural sciences
Citation
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Q1
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N/A
OpenCitations Citation Count
7
Source
Advances in Dıfference Equatıons
Volume
2012
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CrossRef : 3
Scopus : 9
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9
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8
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18
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