Soliton solutions of Gursey model with bichromatic force | Zendy

Eren Tosyalı | Zendy; F. Aydogmus Sen | Zendy

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Soliton solutions of Gursey model with bichromatic force

Author(s) -

Eren Tosyalı,

F. Aydogmus Sen

Publication year - 2019

Publication title -

aip conference proceedings

Language(s) - English

Resource type - Conference proceedings

SCImago Journal Rank - 0.177

H-Index - 75

eISSN - 1551-7616

pISSN - 0094-243X

DOI - 10.1063/1.5136210

Subject(s) - dirac equation , physics , kadomtsev–petviashvili equation , soliton , conformal map , spinor , mathematical physics , invariant (physics) , nonlinear system , wave equation , generalization , conformal symmetry , mathematical analysis , classical mechanics , quantum electrodynamics , quantum mechanics , mathematics , burgers' equation

Gursey proposed a spinor field equation which is similar to Heisenberg’s nonlinear generalization of Dirac’s equation. This equation is the first nonlinear conformal invariant wave equation. In this paper, we investigate the soliton solutions in Gursey wave equation held in a tilted bichromatic force by constructing their Poincare sections in phase space depending on the system parameters.

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