1) fractional integration of variable order
变阶分数次积分
1.
A Lipschitz-space of variable order in mean sense is introduced,and the Lipschitz boundedness about fractional integration of variable order on sphere is researched.
本文引入一种平均意义下的变阶 Lipschitz空间 ,并讨论了球面上变阶分数次积分的Lipschitz有界性 。
2) Spherical fractional integral of variable order
球面上的变阶分数次积分
3) fractional integral
分数阶积分
1.
In this paper,Using the concept of fractional continuity,we discuss the fractional differentiability and integrability problems,and give a sufficient condition of fractional differential and fractional integral inverse of each other.
利用分数阶连续性概念,讨论了分数阶可微与可积性问题,给出了分数阶微分与分数阶积分互逆性的一个充分条件。
4) Order of fractional differential
分数阶微分阶次
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。
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。
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