1) second order Stieltjes integral
二级Stieltjes积分
2) Cauchy-Stieltjes integral
Cauchy-Stieltjes积分
1.
Taylor coefficients and multipliers of Cauchy-Stieltjes integrals;
泰勒系数和Cauchy-Stieltjes积分的乘子
2.
Some properties of Cauchy-Stieltjes integrals and their multipliers on the n-dimensional complex space are studied .
讨论了n维复空间Cn中Cauchy-Stieltjes积分Fnp及其乘子Mnp的一些性质。
3.
We consider the function space Fα consisting of Cauchy-Stieltjes integrals.
本文研究由Cauchy-Stieltjes积分形成的函数空间Fα。
3) Volterra-Stieltjes integral
Volterra-Stieltjes积分
1.
Solvability of nonlinear Volterra-Stieltjes integral equation;
非线性Volterra-Stieltjes积分方程的解
5) Henstock-Stieltjes integral
Henstock-Stieltjes积分
1.
In this paper, we introduce and investigate the Henstock-Stieltjes integral for Banach-valued function with respect to a real valued function defined on closed intervals of the real line.
本文引入闭区间上实值函数关于向量值函数的Henstock-Stieltjes积分,研究了Henstock- Stieltjes积分的性质,给出了Henstock-Stieltjes积分可积的充要条件,并得到了Henstock- Stieltjes积分的收敛定理,最后证明了向量值函数在闭区间上关于实值右连续函数是Pettis可积,那么必为Henstock-Stieltjes可积。
6) Stieltjes integral
Stieltjes积分
1.
It is proved that under certain conditions,if ξ is given in the second mean value theorem of Stieltjes integral then limb→aξ-ab-a=kk+m 1/m.
证明了Stieltjes积分第二中值定理中的 ξ,在一定条件下有limb→aξ -ab -a =kk +m1/m 。
2.
It is proved that under certain conditions,if ξ is given in the second mean value theorem of Stieltjes integral,then lim b→aξ-ab-a=12.
证明了Stieltjes积分第二中值定理中的 ξ ,在一定条件下有limb→aξ-ab -a =12 。
3.
It is proved that in the mean value theorem of stieltjes integral,when b→a, ξ will terd to themean point of a and b.
证明了Stieltjes积分中值定理中的ξ,在一定的条件下,当b→a时,它将趋于a和b的中点,即。
补充资料:Lebesgue-Stieltjes积分
Lebesgue-Stieltjes积分
Lebesgue-Stidtjes integral
1划比s粤犯一Sdd扣积分【h加s邵犯~S创娜如魄阳l;Jle6-era一Clll~ca“。Te印“l I月犯s脾积分(玩bes胖加比g几。)的一种推广.对于非负测度料“玫besgue一Stieltjes积分”一词用于当X一R”,;为非玫城胖测度的情形;于是积分lxfd;像一般情形下玫besg优积分一样定义,若拜是变号的,则拜=拜:一拼2,这里拼:,拼2均为非负测度,而玫besgue一Stieltjes积分定义为 夕““一夕“。l一夕‘,2,只要右边两个积分存在.对X二R’情形,召的可数可加性与有界性条件等价于拼由某个有界变差函数中生成.此时玩比591姆一Stie均es积分可写为 b 丁,“,的形式.关于离散测度的玫besg姆.Stiel幼es积分实际上是一数项级数.
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