lipschitz space 中文意思是什麼
lipschitz space
解釋
李普希茨空間-
Second, we discuss composition operators on bloch space with closed range. by using a distortion theorem of bonk, minda and yanagihara about bloch functions, we obtain the sharp estimation of the lipschitz continuity of the dilation of bloch functions. then, we improve a theorem of ghatage, yan and zheng about composition operators on bloch space with closed range
其次研究了bloch空間上有閉值域的復合運算元,先利用bonk 、 minda和yanagihara關于bloch函數的一個偏差定理,得到bloch函數伸縮率的lipschitz連續性的精確估計式,用這個估計式改進了ghatage 、 yan和zheng關于bloch空間上關于有閉值域的復合運算元的一個定理。 -
Lipschitz - operator algebras on non - compact metric space
空間上運算元代數的超自反性 -
Fixed - point iteration for uniform lipschitz asymptotically nonexpansive mapping of uniform convex banach space
一致李普希茲漸進非擴張映射的不動點迭代問題 -
A new characteristic of lipschitz function in homogeneous space
函數的一個新刻畫 -
The same rank lipschitz continuous development of single - valued mappings is proven by means of partially ordered theory on finite dimensional euclidean spaces. the problem that under what conditions the - resolvent operator of a maximal tj - monotone set - valued mapping is a lipschitz continuous single - valued mapping on whole space, which also answers the open problem mentioned above, is studied on finite dimensional euclidean spaces. the problem is researched that under what conditions the - resolvent operator of - subdifferential mapping of a proper functional is a lipschitz continuous single - valued mapping on whole space
?引入了集值映射的-預解運算元概念;藉助于偏序理論證明了有限維歐氏空間中的單值映射可同秩lipschitz連續拓展;討論了有限維歐氏空間中的極大-單調集值映射的-預解運算元在什麼條件下是整個空間上的一個lipschitz連續的單值映射,這一結果也在有限維空間上解決了上面提到的公開問題;還討論了真泛函的-次微分映射的-預解運算元在什麼條件下是整個空間上的一個lipsehitz連續的單值映射。 -
In chapter 2, we study the existence of the global attractor the complex ginzburg - landau equation in three dimensions space. first, we consider existence of local solu - tion. for a given perturbation n ( u ), we prove n ( u ) is contractive and locally lipschitz continuous
在第二章,考慮ginzburg - landau方程在三維空間的整體吸引子的存在性,首先考慮ginzburg - landau方程的局部解的存在性,對於一給定的擾動項n ( u ) ,證明n ( u )是收縮的且是局部lipschitz連續的。
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