運算上的 的英文怎麼說
中文拼音 [yùnsuànshàngde]
運算上的
英文
operational-
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。Regularity of continuous linear operators on banach function spaces
函數空間上連續線性運算元的正則性In chapter 3, we will estimate the first eigenvalue of laplacian from below on manifolds with a little negative curvature. in chapter 4, we will prove the existence of bounded nontrivial harmonic functions on some classes of complete manifolds which will generalize the results of s. y. cheng ' s
在第三章,我們將給出具有小負曲率的流形上laplace運算元的第一特徵值的下界估計;第四章,我們會給出一類完備非緊流形上非平凡的有界調和函數的存在性,推廣了s . y . cheng的結果。The article stated here will give some remarks to the following equation in two cases : for the case > 0, the equation expresses the eigenvalue of the laplacian while for the case = 0, it is the existence of nontriv - ial bounded harmonic functions on complete noncompact manifolds
本文中我們主要分兩種情況來討論了關于laplace運算元的方程: u + u = 0 , r ~ + { 0 }對應於0 ,是riemann流形上laplace運算元的特徵值問題,而對應于= 0則是完備非緊流形上非平凡的有界調和函數的存在性問題。The mp - filters and fuzzy filters of a implication algebra on a partial ordered set are studied with the condition given in chapter 2 which implicative operator should satisfy
利用上述得到的關于蘊涵代數中蘊涵運算元的條件,研究偏序集上具有條件( c )的蘊涵代數的mp濾子及fuzzy濾子。Extension of isometries between unit sphere
單位球面上的等距運算元的延拓11 katoen j - p, langerak r, latella d, brinksma e. on specifying real - time systems in a causality - based setting. lecture notes in computer science 1135, 1996, pp. 385 - 405. 12 fecher h, majster - cederbaum m, wu j. refinement of actions in a real - time process algebra with a true concurrency model
在系統模型的結構表示上,本文擴充了傳統的事件結構,使用一種帶時間信息的捆綁式事件結構來模擬系統行為,在系統模型的語言刻畫上,本文採用的是帶時間的類lotos進程代數描述語言,對于動作精化,我們同樣採用運算元的觀點,將動作精化定義為一個操作運算元。The simulation of these particular systems is based on a fractional integrator where the non - integer behavior acts only on a limited spectral band
這種特殊系統的模擬建立在有限頻率區間非整數階積分運算元的基礎上,其非整數階作用僅限於有限頻率區域。Bounded below property of composition operator on bloch space in cn unit ball
空間上復合運算元的下有界性Boundedness of some operators on the heisenberg group
群上一類運算元的有界性We study the relation of carleson measure and toeplitz operator on bergman space of bounded symmetry domians, and give a charactering of a composition operator, also give a charactering of bounded and compact weighted composition operator
研究了有界對稱域上bergman空間的carleson測度與toeplitz運算元的關系。研究了有界對稱域上bergman空間上復合運算元的一個特性。給出了加權復合運算元的有界性及緊性的刻畫。The second part consist of chapter four. in chapter one, we study the energy density of harmonic map from finsler manifold and generalize classical result in [ se ]. in chapter two, we obtain lower estimates for the first eigenvalue of the laplace operator on a compact finsler manifold, and it generalize lichnerowicz - obata theorem [ li ] [ ob ]. in chapter three, we derive the first and second variation formula for harmonic maps between finsler manifolds. as an application, some nonexistence theorems of nonconstant stable harmonic maps from a finsler manifold to a riemannian manifold are given
第一章討論finsler流形到黎曼流形調和映射的能量密度的間隙性,推廣了[ se ]中的結果。第二章對緊致finsler流形上laplace運算元的第一特徵值的下界作了估計,推廣了黎曼流形上的lichnerowicz - obata定理[ li ] [ ob ] 。The theorems of positive operators of banach lattice and positive operators are an inseparable part of the general banach space and operator theory
另一方面,研究了hilbert格和banach格上正運算元的一系列性質,得到了許多良好的結果。The results that are quoted in this paper are classical conclusions. on the basis of the results. this paper discusses the invertibility of operators. ci operators and generalizes. some results about spectral theory of bounded operators and properties of mbekhta subspaces in terms of mbekhta subspaces
本文中引用的結論大都是此方面的經典結論。在此基礎上,本文作者運用mbekhta子空間討論了有界線性算予的可逆性, ci運算元的判定。( 2 ) based on lattice theory, we introduce a relation called lee ( lattice - epistemic entrenchment ), explore the properties of contraction based on lee and get a serial of interesting representation theorems
建立了基於lee序的收縮函數的基本表示定理,然後在基本表示定理的基礎上逐一建立了基於幾類特殊lee序的收縮運算元的表示定理。Some applications of the laplacian of orthonormal frame bundles
正交標架叢上拉普拉斯運算元的一些應用Some basic theorems for linear operators between fuzzy normed spaces
模糊賦范空間上線性運算元的基本定理In the first part, the simultaneous approximation of this kind of operators is studied ; in the second part the approximation in c [ 0, ) of their linear combination is discussed. absorbing the method of paper [ 20 ], the inverse theorem of a new kind of linear combination operators is obtained in the third part
第一節研究這類運算元的同時逼近;第二節討論該運算元線性組合在c _ [ 0 , )上的逼近;第三節吸收[ 20 ]的思想,得到了該運算元線性組合逼近的逆定理;第四節討論該線性組合運算元在c _ [ 0 , )逼近的飽和定理。And finally, the complement operator inverts the value of each bit of the operand : if the operand bit is 1 the result is 0 and if the operand bit is 0 the result is 1
最後,上面的互補運算符(按位異或)對兩個操作數的每個比特位進行值的轉化:操作數比特位是1的(另一個為0 )運算后的(比特位)結果為1 ,比特位為0 (而另一個操作數為1的) ,計算后結果為1This dissertation will deal with the dual spaces and boundedness of the bergman type operator on mixed norm spaces, mainly with small exponent
本論文主要討論小指標混合范數空間的對偶空間及它上面bergman型運算元的有界性。分享友人