1)  fractional integral
分数次
1.
It is well-known that fractional integral operator is one of the important operators in harmonic analysis with background of partial differential equations.
众所周知,分数次积分算子是调和分析中以偏微分方程为背景的一种重要算子。
2)  fractional harmonic
分数次谐波
1.
Multiple harmonics extraction from signal with fractional harmonics;
分数次谐波环境下提取整数次谐波信息的新方法
3)  super-resonance
分数次共振
4)  fractional failure
分数次故障
1.
Therefore, a new concept of fractional failure is presented in this paper to represent the effect of IUD events.
文中针对这种情况,引入"分数次故障"的概念,将IUD等效为分数次故障,用分数次故障的大小来反映IUD的故障严重程度,从而使发电机组的可靠性评估更接近实际情况。
5)  fractional integral
分数次积分
1.
Boundedness of fractional integral operators associated to the sections for non-doubling measures;
非二倍测度下截口上的分数次积分算子的有界性
2.
Riesz potential is an important operator in harmonic analysis,and fractional integral with a homogeneous kernel or a coarse kernel is a lively field arising from researches on Riesz potential.
Riesz位势是调和分析中的重要算子 ,具有齐性核或粗糙核的分数次积分 ,是围绕Riesz位势发展起来的一个非常活跃的课题 。
3.
In this paper we discuss the properties of two kinds of integral operator with variable kernel and prove that fractional integral operator with variable kernel TΩ,μ is bounded from Bp,λ1(Rn).
主要讨论两类带变量核的积分算子的性质,证明了带变量核的分数次积分算子TΩ,μ是从Bp,λ1(Rn)到Bq,λ2(Rn)上的有界算子,其交换子TbΩ,μ是从Bp,λ1(Rn)到Bq,λ2(Rn)上的有界算子。
6)  fractional Bernstein bases
分数次Bernstein基
1.
Moreover,Marsden identity and its Blossoming form for fractional Bernstein bases are given and the example shows that fractional Bernstein bases are more flexible than integral Bernstein bases.
利用指数为分数的二项式定理,将Bernstein基推广到分数次,发展了分数次Bernstein基,得到了与整数次Bern-stein基许多类似的性质及恒等式,而这些性质及恒等式对于整数次Bernstein基仍成立,并且给出了关于分数次Bernstein基的Marsden恒等式及Blossoming形式。
参考词条
补充资料:连分数的渐近分数


连分数的渐近分数
convergent of a continued fraction

连分数的渐近分数l阴ve吧e时ofa阴‘毗d五,比.;n侧卫xp口.坦”八卯6‘] 见连分数(con tinued fraction).
说明:补充资料仅用于学习参考,请勿用于其它任何用途。