1) fractional oscillatory integral operator
分数次振荡积分
1.
In this paper the author give the weighted L p( R n) boundedness for T μ , the fractional oscillatory integral operators with rough kernels, which is defined by T μf(x)=∫ R n e iP(x,y) Ω (x-y)|x-y| n-μ h(|x-y|)f(y) dy.
本文给出了一类带粗糙核的分数次振荡积分算子Tμ,Tμf(x)=∫RneiP(x,y)Ω(x-y)|x-y|n-μh(|x-y|)f(y)dy的加权Lp(Rn)有界性。
2) Integrals of vibration function
振荡函数积分
1.
A Kind of Numerical formula for Integrals of vibration function;
振荡函数积分的一种数值公式
3) highly oscillatory integral
高振荡函数积分
1.
For two kinds of highly oscillatory integrals in engineering, we present methods which have more efficiency and precision than the former methods base on research of efficient numerical methods for highly oscillatory functions in recent years.
高振荡函数积分问题及其数值计算广泛应用于应用数学学科。
4) oscillating integrals
振荡积分
1.
In this paper those methods are used to get approximations of irregularly oscillating integrals, and in most cases their exact values are (gotten.
摄动方法中求定积分所定义的函数的渐进展开式的各种方法被用来求一类广义振荡积分的近似值 ,而且多数情况下得到的是精确
5) oscillatory integral
振荡积分
1.
Great impetus for the study of oscillatory integrals came with their applications to the as-ymptotics of Fourier transforms of special functions, Fourier integral operators and pseudo-differential operators.
振荡积分理论是现代调和分析的核心部分之一。
6) numerical integration of oscillating functions
振荡函数的数值积分
补充资料:分数阶积分与微分
分数阶积分与微分
og fractional integration and differentia-
分数阶积分的逆运算称为分数阶微分:若几介F,则f为F的:阶分数阶导数(na ctional deriVative).若0<戊
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