1) lacunary function
缺项函数
2) gap integral function
缺项整函数
3) Fabry gap
缺项级数
1.
When the dominant coefficient As has Fabry gap,An estimate of the hyper-order of solutions for the above equation is obtained.
研究齐次线性微分方程f(k)+Ak-1f(k-1)+…+Asf(s)+…+A0f=0(1)的增长性问题,其中A0,A1,…,Ak-1是整函数,当存在某个系数As(s∈{0,1,…,k-1})为缺项级数且比其它系数有较快增长的意义下时,得到了微分方程(1)的一定条件下超越解的超级的精确估计。
2.
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.
当存在系数A0为缺项级数且比其他系数有较快增长性时,得到了上述非齐次微分方程解的超级、解取小函数点的超级与方程系数的级3者之间的关系。
3.
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.
研究了非齐次线性微分方程f(k)+Ak-1fk-1+…+Asf(s)+…+A0f=F的增长性问题,其中A0,A1,…,Ak-1,F是整函数,当存在某个系数As(s∈{0,1,…,k-1})为缺项级数且比其它系数有较快增长的意义下时,得到了上述非齐次微分方程的一定条件下超越解的超级的精确估计。
4) omitting coefficient
缺项系数
1.
On the β convexity radius of starlike function with omitting coefficient;
具有缺项系数的星形函数的β凸半径
5) lacunary series
缺项级数
1.
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.
我们研究了代数数系数的缺项级数的代数点上的值,推广了Mahler的一个定理。
6) defect function
缺陷函数
1.
According to the shortcoming of the analysis method in lattice structures that consider initial defect,two reasonable initial geometry defect functions are added in beam element as well as two improved nonlinear beam elements which considering initial geometry defect is derived.
针对现有杆系结构考虑初始缺陷的方法存在不同程度的缺点和不足,在普通梁单元中引入两种合理的初始几何缺陷函数,导出两种改进的考虑初始几何缺陷的非线性梁单元,同时考虑了二阶效应及初始几何缺陷的影响,在此基础上利用MATLAB编写了有限元程序。
补充资料:缺项
1.犹缺门。指工程建设﹐科学研究﹐艺术﹑体育表演等缺少的项目。
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条