Entire functions satisfying a linear differential equation

which are entire functions, for growth problems\_ All such functions, when they satisfy a class of differential equations, are of bounded index and exponential type, and their components are also of bounded index\_

We suggest an explicit procedure to establish upper bounds for the number of real zeros of analytic functions satisfying linear ordinary differential equations with meromorphic coefficients. If the equation has no singular points in a small neighborhood U of a real segment K, all the coefficients a

Based on the coefficients of two homogeneous linear differential equations, a method is proposed to construct a third homogeneous linear differential equations which is satisfied by all products of the form uv, where u and v satisfy, respectively, the first and the second given differential equation

In the paper the general linear functional differential equation with several distributed deviations is considered. Sufficient conditions for the equation to have Property A (see Definition 1.2 below) are established. The obtained results are new even for Eq. (1.4).