1) convergent in measure
依测度收敛的
2) convergence in measure
依测度收敛
1.
The condition of multiplicating and dividing the convergence in measure of the measurable function sequence on infinite measurable set;
可测函数列在无限测度集上依测度收敛乘除成立的条件
2.
The definitions and properties of strong convergence,weak convergence and convergence in measure of integrable fanction space L~p are generalized in the paper.
文章对可积函数空间L~P中强收敛、弱收敛和依测度收敛几种收敛的定义和性质进行归纳和总结,讨论他们之间的关系,并给出了相应结果的证明,从而使各种收敛关系更加明晰和透彻。
3) opial property in meature
依测度收敛的Opial性质
4) Banach-Saks property for convergence in measure
依测度收敛的Banach-Saks性质
5) Opial property in measure
依测度收敛的Opia1性质
6) Opial modulus in measure
依测度收敛的Opia1模
补充资料:依测度收敛
依测度收敛
convergence in measure
依侧度收徽【。刃犯吧en理in meas城;。朋口.M0cT‘n。Me衅』 见收徽性的类型(conve卿n优,tyPesof).
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