1) P-harmonic type tensors
P-调和类型张量
2) A-harmonic tensor
A-调和张量
1.
Abstract By using the technique of weighted inequalities,local Ar(λ1,λ2;Ω)-weighted weakly reverse Hlder inequality for A-harmonic tensors is proved.
利用加权技巧,证明了A-调和张量的局部Ar(λ1,λ2;Ω)-双权弱逆H lder不等式。
2.
In this paper, we first introduce a new weight-A_r~(λ_3)(λ_1, λ_2, Ω)-weight, and then prove the two-weight Caccioppoli-type estimates and the two-weight weak reverse Holder inequalities for A-harmonic tensors, which can be regarded as generalizations of the classical results.
在这篇文章中,我们首先给出了一个新权A_r~(λ_3)(λ_1,λ_2,Ω)权,然后证明了关于A-调和张量的A_r~(λ_3)(λ_1,λ_2,Ω)双权Caccioppoli-型估计和A_r~(λ_3)(λ_1,λ_2,Ω)双权弱逆H(?)lder不等式。
3.
Specif-ically speaking, we study the Poincaréinequality for the general differential forms andthe Poincaréinequality for a special differential formΩA-harmonic tensor.
具体来说,分别研究了关于一般微分形式的Poincaré不等式和一种特殊的微分形式– A-调和张量的Poincaré不等式。
3) A-harmonic tensors
A-调和张量
1.
A local Aλ_r (Ω)-weighted Hardy-Littlewood inequality for differential forms satisfying the A-harmonic tensors is proved.
首先证明了A-调和张量的加Aλr(Ω)-权函数的局部Hardy-Littlewood不等式,此结果类似于Hardy和Littlewood的一个早期不等式。
2.
In this paper we first prove an Ar(λ,Ω)-weighted Caccioppoli-type inequality for A-harmonic tensors.
在这篇文章中,我们首先证明了A-调和张量的A_r(λ,Ω)加权Caccioppoli型不等式。
4) p-harmonic model
p调和模型
5) p-Biharmonic-like operators
类p-双调和算子
6) P-Harmonic form systems
p-调和型方程组
补充资料:血液有形成分各种类型的血细胞虚线指示中间类型的细胞。
李瑞端绘
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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