Classification of semidiscrete hyperbolic type equations. The case of fifth order symmetries

R. N. Garifullin
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Abstract

The work deals with the qualification of semidiscrete hyperbolic type equations. We study a class of equations of the form $$\frac{du_{n+1}}{dx}=f\left(\frac{du_{n}}{dx},u_{n+1},u_{n}\right),$$ here the unknown function $u_n(x)$ depends on one discrete $n$ and one continuous $x$ variables. Qualification is based on the requirement of the existence of higher symmetries. The case is considered when the symmetry is of order 5 in continuous directions. As a result, a list of four equations with the required conditions is obtained. For one of the found equations, a Lax representation is constructed.
半离散双曲型方程的分类。五阶对称的情况
本研究涉及半离散双曲型方程的定性。我们研究了一类形式为$$\frac{du_{n+1}}{dx}=f/left(\frac{du_{n}}{dx},u_{n+1},u_{n}/right)的方程,$$这里未知函数$u_n(x)$取决于一个离散变量$n$和一个连续变量$x$。限定基于高对称性存在的要求。我们考虑了对称性为 5 阶不连续方向的情况。结果,得到了具有所需条件的四个方程的列表。针对其中一个方程,构建了一个 Lax 表示。
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