A family of integrable and non-integrable difference equations arising from cluster algebras

Abstract

The one-parameter family of second order nonlinear difference equations each of which is given by xn-1xnxn+1=xn-1+(xn)β-1+xn+1 (β∈N) is explored. Since the equation above is arising from seed mutations of a rank 2 cluster algebra, its solution is periodic only when β≤3. In order to evaluate the dynamics with β≥4, algebraic entropy of the birational map equivalent to the difference equation is investigated; it vanishes when β=4 but is positive when β≥5. This fact suggests that the difference equation with β≤4 is integrable but that with β≥5 is not. It is moreover shown that the difference equation with β≥4 fails the singularity confinement test. This fact is consistent with linearizability of the equation with β=4 and reinforces non-integrability of the equation with β≥5.