On the algebraic non-integrability of Halphen system

We extend Halphen's theorem which characterizes solutions of certain nth-order differential equations with rational coefficients and meromorphic fundamental systems to a first-order n × n system of differential equations. As an application of this circle of ideas we consider stationary rational alge

On the Non-integrability of Gros+Neveu Models EMIL HOROZOV We prove that the classical Gross-Neveu models. corresponding to the Li e algebras ,x>(5). .~0(6), .~)(7), .sp(4). .xp(6). .x/(3). and .t/(4) do not possess i ndependent holomorphic tirst integrals i n a quantity required for their integrabi

In this note, we study the relation between the existence of algebraic invariants and integrability for planar polynomial systems. It is proved, under certain genericity conditions, that if the sum of the degrees of the algebraic invariants exceeds the degree of the polynomial system by one, then th