riesz 中文意思是什麼
riesz
解釋
里斯-
In addition, a counterexample is constructed to show that the characterization and the related results do not hold for the non - archimedean riesz space r # with the lexicographical ordering
同時構造一個反例說明,對于r ~ n按字典順序做成的非阿基米德riesz空間的情形,這個刻畫及相應結果並不成立。 -
In particular, the stability for riesz basis, bessclian frame, riesz frame is provable if they are acted by a invertible opetator respectively
特別, riesz基、 besselian框架、 riesz框架,投影法可行框架在相似意義下具有穩定性第三節研究含riesz基框架的攝動 -
If is a riesz basis for only is n ' t contained in span, then is a riesz basis for span by using ( )
N的r二sz基,切。廠不必含于廁人h 。 n ;則在( )式下可得沮入。 -
Eventually, one may remove the large parameter a from the auxiliary problems by fredholm - riesz - schauder theory and extremal principle. thus the well - posedness and the regularity of the original problem will be obtained in a standard way. for the sake of convenience, we introduce some symbols
最後,利用跡定理和局部化技巧可以把問題在每個區域上的解拼起來,從而得到該類問題在整個一般區域上的hl弱解存在唯一性及解的高階正則性和高階模估計 -
In this paper, the orthomorphisms on the archimedean riesz space r " with the usual coordinatewise ordering are characterized. also, the direct sum decomposition of an order bounded operator with respect to the orthomorphisms is obtained
本文首先刻畫了n維歐氏空間r ~ n按通常的偏序做成的阿基米德riesz空間上正交射的特徵,以此可對r ~ n上序有界運算元作關于正交射的直和分解。 -
( ii ) riesz frame and satisfied method frame are the same sort respectively if they are acted by a linear bound operator with it ' s inverse existed and bound
門) r的sz框架不必是besselian框架,反之亦然wesz框架和投影法可行框架在線性有界逆存在且連續運算元作用下具有穩定性 -
The first results of riesz space and positive operators go back to f. riesz ( 1929 and 1936 ). since then positive operator theorems have always played an essential role on the subject of functional analysis and have been applied to some fields such as mathematical physics and economics
自從二十世紀三十年代, f . riesz首次提出riesz空間和正運算元以來,正運算元的研究一直成為人們關注的課題,並逐步把這一理論開拓到應用領域,使得正運算元理論在數學物理,經濟學方面得到廣泛運用。 -
Riesz basis - based reproducing kernel and svm
基的再生核及支持向量機 -
Inspired by the work of james r. holub on [ 11 ], we come to some conclusions for the general traits, perturbation, alternatc dual of bcsselian frame, besides generalize some of stability result on riesz basis in view of [ 5 ], [ 9 ]. we show some perturbation results of riesz frame by adding a slightly strong condition to the ordinary ones. also, we study alternate dual and disjoint for frames which contain a riesz basis and discuss their relations. there are four sections in this paper
受文獻[ 11 ]的啟發,探討了besselian框架的一般性質、攝動、交錯對偶,得到了一系列結果在[ 5 ] , [ 9 ]的基礎上推廣了risez基的穩定性結果,得出了riesz框架滿足攝動的條件。此外,研究了含riesz基框架的交錯對偶及其不交性質,討論了各種含riesz基框架的相互關系。 -
Perturbation of riesz frame and frame in hilbert space
框架和框架的擾動性 -
Weighted boundedness for maximal multilinear bochner - riesz operators on certain hardy - block spaces
空間的加權有界性 -
A remark of m. riesz theorem
定理的注記 -
The inverse is not true. ( iv ) riesz frame need n ' t a besselian frame. the inverse is exactly the same
( ? ) besselian框架不必是投影法可行框架,投影法可行框架也不必是besselian框架,並例示 -
We consider frames which contain a riesz basis in hilbert space and focus our attention on those general characteristics, stability, disjoint and alternate dual
本文主要在hilbert空間上探討含riesz基框架的一般性質、穩定性,不相交性及其交錯對偶的情況。
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