Some properties of meromorphic solutions and the relation between meromorphic solutions and functions of small growth are obtained,when there is one coefficient being one Fabry gap series which is dominating to the properties of the solutions.

When the dominant coefficient As has Fabry gap,An estimate of the hyper-order of solutions for the above equation is obtained.

The relationship among the hyper order of growth of the solution of equation,the hyper order of growth of solution to small order of growth function and the order of growth of coefficient of equation are obtained,when the dominant coefficient A0 has Fabry gap.

By using the Nevanlinna Value distribution theory,the paper investigates the growth of solutions of the differential equation f(k)+Ak-1fk1+…+Asf(s)+…+A0f=F,where A0,A1,…,Ak-1,F are entire functions and the dominant coeffcient As has fabry gap,it obtaines general estimates of the growth and zeros of entire solutions of higher order linear differential equations.

We studied the values of the lacunary series with algebraic coefficients on the algebraic points,and got a theorem which generalized one of Mahler s.

In this paper we discuss the relation between the minimum modulus and the maximum terms of gap power series, and improve the result due toP.