Lie symmetries of a generalized Kuznetsov-Zabolotskaya-Khoklov equation

We consider a class of generalized Kuznetsov–Zabolotskaya–Khokhlov (gKZK) equations and determine its equivalence group, which is then used to give a complete symmetry classification of this class. The infinite-dimensional symmetry is used to reduce such equations to (1+1)-dimensional PDEs. Special attention is paid to group-theoretical properties of a class of generalized dispersionless KP (gdKP) or Zabolotskaya–Khokhlov equations as a subclass of gKZK equations. The conditions are determined under which a gdKP equation is invariant under a Lie algebra containing the Virasoro algebra as a subalgebra. This occurs if and only if this equation is completely integrable. A similar connection is shown to hold for generalized KP equations.

💡 Research Summary

The paper investigates a broad class of two‑dimensional nonlinear wave equations obtained by generalising the classic Kuznetsov–Zabolotskaya–Khokhlov (KZK) model. The authors consider the equation

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