Lie Symmetries and Low-Order Conservation Laws of a Family of Zakharov-Kuznetsov Equations in 2 + 1 Dimensions

In this work, we study a generalised (2+1) equation of the Zakharov–Kuznetsov (ZK)(m,n,k) equation involving three arbitrary functions. From the point of view of the Lie symmetry theory, we have derived all Lie symmetries of this equation depending on the arbitrary functions. Line soliton solutions have also been obtained. Moreover, we study the low-order conservation laws by applying the multiplier method. This family of equations is rich in Lie symmetries and conservation laws. Finally, when the equation is expressed in potential form, it admits a variational structure in the case when two of the arbitrary functions are linear. In addition, the corresponding Hamiltonian formulation is presented.

[1]  Chaudry Masood Khalique,et al.  Conservation Laws and Exact Solutions of a Generalized Zakharov-Kuznetsov Equation , 2015, Symmetry.

[2]  Juan Zhang,et al.  Lie Symmetry Analysis and Exact Solutions of Generalized Fractional Zakharov-Kuznetsov Equations , 2019, Symmetry.

[3]  A. Wazwaz The extended tanh method for the Zakharov–Kuznetsov (ZK) equation, the modified ZK equation, and its generalized forms , 2008 .

[4]  Chaudry Masood Khalique,et al.  Exact solutions of the (2+1 )-dimensional Zakharov-Kuznetsov modified equal width equation using Lie group analysis , 2011, Math. Comput. Model..

[5]  Chaudry Masood Khalique,et al.  Symmetry reductions and exact solutions of a variable coefficient (2+1)-Zakharov-Kuznetsov equation , 2012 .

[6]  Stephen C. Anco,et al.  Direct construction method for conservation laws of partial differential equations Part I: Examples of conservation law classifications , 2001, European Journal of Applied Mathematics.

[7]  Abdul-Majid Wazwaz,et al.  A one-soliton solution of the ZK(m,n,k) equation with generalized evolution and time-dependent coefficients , 2011 .

[8]  G. Bluman,et al.  Direct construction method for conservation laws of partial differential equations Part II: General treatment , 2001, European Journal of Applied Mathematics.

[9]  E. Zayed,et al.  Exact solutions of the Biswas-Milovic equation, the ZK(m,n,k) equation and the K(m,n) equation using the generalized Kudryashov method , 2016 .

[10]  E. Parkes,et al.  The derivation of a modified Zakharov–Kuznetsov equation and the stability of its solutions , 1999, Journal of Plasma Physics.

[11]  H. Schamel A modified Korteweg-de Vries equation for ion acoustic wavess due to resonant electrons , 1973, Journal of Plasma Physics.

[13]  Rita Tracinà,et al.  On the nonlinear self-adjointness of the Zakharov-Kuznetsov equation , 2014, Commun. Nonlinear Sci. Numer. Simul..

[14]  Yao-Dong Yu,et al.  The auxiliary equation method for solving the Zakharov-Kuznetsov (ZK) equation , 2009, Comput. Math. Appl..

[15]  Symmetry Solutions and Reductions of a Class of Generalized .2 C 1/-dimensional Zakharov–Kuznetsov Equation , 2011 .