On a systems of rational difference equations of order two (Q2818522)

The author studies the following system of rational difference equations: NEWLINE\[NEWLINE\begin{aligned} x_{n+1}& =\frac{x_{n-1}}{\alpha+\beta x_{n-1} y_n} \\ y_{n+1} & =\frac{y_{n-1}}{\gamma+\delta y_{n-1}x_n},\qquad n=0,1,2,3,\dots \end{aligned}NEWLINE\]NEWLINE where the parameters \(\alpha,\beta, \gamma\), and \(\delta\) are integers, and the initial conditions \(x_{-1},x_0, y_0, y_{-1}\) are nonzero real numbers. In particular, the author obtains explicit solution formulas for the quadruples NEWLINE\[NEWLINE(\alpha,\beta,\gamma,\delta)\in\{(-1,-1,1,-1),(1,1,1,-1),(-1,1,-1,-1),(-1,1,1,-1),(1,1,-1,-1)\}.NEWLINE\]