Non-Integrability of Some Higher-Order Painlev\'e Equations in the Sense of Liouville

Abstract

In this paper we study the equation w(4) = 5 w" (w2 - w') + 5 w (w')2 - w5 + (λ z + α)w + γ, which is one of the higher-order Painlev\'e equations (i.e., equations in the polynomial class having the Painlev\'e property). Like the classical Painlev\'e equations, this equation admits a Hamiltonian formulation, B\"acklund transformations and families of rational and special functions. We prove that this equation considered as a Hamiltonian system with parameters γ/λ = 3 k, γ/λ = 3 k - 1, k ∈ Z, is not integrable in Liouville sense by means of rational first integrals. To do that we use the Ziglin-Morales-Ruiz-Ramis approach. Then we study the integrability of the second and third members of the PII-hierarchy. Again as in the previous case it turns out that the normal variational equations are particular cases of the generalized confluent hypergeometric equations whose differential Galois groups are non-commutative and hence, they are obstructions to integrability.