On the Arithmetic Size of Linear Differential Equations

We treat the linear differential equation ) f q A z f s 0, where k P 2 is Ž . Ž . an integer and A z is a transcendental entire function of order A . It is shown Ž . Ž . Ž . Ž . that any non-trivial solution of the equation ) satisfies f P A , where f is the exponent of convergence of the zero-sequ

Let K be a field of characteristic zero and M(Y ) = N a system of linear differential equations with coefficients in K(x). We propose a new algorithm to compute the set of rational solutions of such a system. This algorithm does not require the use of cyclic vectors. It has been implemented in Maple

There are occasions when a linear autonomous functional differential equation of mixed type can be reduced to a neutral or retarded equation. A necessary condition for such reducibility is shown to be that the set of solutions of the characteristic equation is bounded on the right in the complex pla

Dekker, New York), we showed that if a function f (x) meromorphic in all C p is a solution of a homogeneous linear differential equation (E) with coefficients in Q (x), then f # C p (x). Here we show that this conclusion is false in the case where (E) is with coefficients not in Q (x). ## 2001 Acad