例句與造句

1. on the characteristic polynomial and characteristic root of the orthogonal matrix
   正交矩陣的特征多項式及特征根
2. the construction of a class of compactly supported orthogonal matrix-valued wavelets
   一類緊支撐矩陣值正交小波的構(gòu)造
3. complex orthogonal matrix
   復(fù)正交矩陣
4. an orthogonal matrix is an invertible matrix for which the inverse is equal to the transpose
   正交矩陣是可逆矩陣，其逆矩陣等于其轉(zhuǎn)置矩陣。
5. the least-square solutions of the inverse problem of symmetric orthogonal matrices is discussed, and expression of the solution is obtained
   摘要討論了對稱正交對稱矩陣反問題的最小二乘解，得出了解的表達(dá)式。
6. It's difficult to find orthogonal matrices in a sentence. 用orthogonal matrices造句挺難的
7. in the second chapter, we deal with two types of the problem : real and complex, and analyzes the backward perturbation of eigenpair of orthogonal matrix
   第二章分“實的”和“復(fù)的”兩種情形，分別對正交矩陣的特征對的向后擾動問題作了研究。
8. the concept of orthogonal matrix and four properties of generalized orthogonal matrix in determinant, characteristic solution and adioint matrix were discussed
   摘要推廣了正交矩陣，并研究了廣義正交矩陣在行列式、特征根、伴隨矩陣等問題中的四個性質(zhì)。
9. the concept of orthogonal matrix and four properties of generalized orthogonal matrix in determinant, characteristic solution and adioint matrix were discussed
   摘要推廣了正交矩陣，并研究了廣義正交矩陣在行列式、特征根、伴隨矩陣等問題中的四個性質(zhì)。
10. most current algorithms only work well in special conditions, because of the abnormity of signals in the real world . now, the research in the ica arises much passion and the ica has brought about many applications . the primary results the writer has got are as the following : after a whiting process, it is a key to find an orthogonal matrix to throw away the high-order redundant information between components
    由于現(xiàn)實生活中信號十分不規(guī)則,目前提出的算法大多只能針對某類信號分離,鑒于目前在ica方面極大的研究熱情和強(qiáng)大的背景支持,作者對ica離線算法做了一定研究,主要內(nèi)容和工作包括如下:ica問題經(jīng)過白化處理后,尋找去除高階相關(guān)的正交矩陣成為問題關(guān)鍵,而正交矩陣具有特殊的空間結(jié)構(gòu),組成它的每個列向量可視作rn中單位超球表面上一點,當(dāng)這些點彼此垂直時,整體就組成一個正交矩陣。
11. the balanced multiwavelet was studied . for low-pass matrix filter p ( ), the orthogonal matrix r was selected to ensure the constant signal as a characteristic signal of balanced low-pass matrix filter rtp ( ) r, the corresponding balanced high-pass matrix filter is q ( ) r or rtq ( ) ) r which maintain the orthogonality and symmetry or orthogonality only respectively . as an application, the optfr-multiwavelet constructed by jiang was balanced and applied to image denoising and fusion
    研究了多小波的平衡處理，對低通濾波器p()一般選擇平衡器為正交矩陣r，使得常數(shù)信號成為平衡后的低通濾波器r~tp()r的特征信號，若要保持矩陣濾波器的正交性和對稱性，可選擇平衡后的高通濾波器為q()r；若只保持多小波的正交性，可選擇高通濾波器為r~tq()r。
12. to solve the problem, a kind of multi-ontology analysis framework consisted of orthogonal matrix made up of multi-dimensional ontology model and temporal model is re-searched; and then multi-dimension knowledge warehouse based on xml topic maps is constructed, which is developed to implement the accurate and efficient storing and retrieving for knowledge of semantic level
    針對這個問題，研究了通過多維本體模型和時域模型的正交矩陣構(gòu)建的多本體分析框架，并以此為基礎(chǔ)，構(gòu)建了基于xml主題地圖技術(shù)的多維知識倉庫，實現(xiàn)了高效準(zhǔn)確的語義級知識的存儲和檢索。
13. it discusses the non-degeneration of higher-order cib functions . it gives an analysis of the methods of constructing orthogonal matrixes in bibliography [ 5 ] and [ 18 ], proves that the functions obtained using these methods are all degenerated; gives a conclusion that all the 2-order functions are degenerated for the case of weight 8; presents a simpler proof for the theorem " all the 2-order cib functions are non-degenerated for the case of weight 8k + 4'in bibliography [ 5 ]; provides an example of non-degenerated balanced 2-order cib for the first time . 4
    分析了文獻(xiàn)[5]和[18]中高階相關(guān)免疫布爾函數(shù)的構(gòu)造方法，指出其所獲得的函數(shù)都是退化的；證明了重量為8的2階相關(guān)免疫布爾函數(shù)都是退化的；給出了文獻(xiàn)[5]中結(jié)論“重量為8k+4的2階相關(guān)免疫布爾函數(shù)都是非退化的”的分析性證明；首次給出了一個非退化的平衡高階相關(guān)免疫布爾函數(shù)的實例。
14. orthogonal matrixes have special structures, and every row vector of them can be taken as a plot, which may be parametrized in n-sphere space . through the research of structures of orthogonal matrixes, the writer finds a parametrized matrix, which can express all the orthogonal matrixes . through analysing uprightness between related high-order planes and the number of required parameters, we get the maturity of this method
    自然的,這些點可以用其球坐標(biāo),即與各坐標(biāo)軸的夾角來參數(shù)化,作者通過觀察正交矩陣的幾何結(jié)構(gòu),最終找到了任意維數(shù)的隨機(jī)正交矩陣的參數(shù)表示方法,通過分析相關(guān)超平面之間的垂直關(guān)系和參數(shù)化正交矩陣需要的參數(shù)個數(shù),論證了這種表示的完備性。
15. orthogonal matrixes have special structures, and every row vector of them can be taken as a plot, which may be parametrized in n-sphere space . through the research of structures of orthogonal matrixes, the writer finds a parametrized matrix, which can express all the orthogonal matrixes . through analysing uprightness between related high-order planes and the number of required parameters, we get the maturity of this method
    自然的,這些點可以用其球坐標(biāo),即與各坐標(biāo)軸的夾角來參數(shù)化,作者通過觀察正交矩陣的幾何結(jié)構(gòu),最終找到了任意維數(shù)的隨機(jī)正交矩陣的參數(shù)表示方法,通過分析相關(guān)超平面之間的垂直關(guān)系和參數(shù)化正交矩陣需要的參數(shù)個數(shù),論證了這種表示的完備性。
16. orthogonal matrixes have special structures, and every row vector of them can be taken as a plot, which may be parametrized in n-sphere space . through the research of structures of orthogonal matrixes, the writer finds a parametrized matrix, which can express all the orthogonal matrixes . through analysing uprightness between related high-order planes and the number of required parameters, we get the maturity of this method
    自然的,這些點可以用其球坐標(biāo),即與各坐標(biāo)軸的夾角來參數(shù)化,作者通過觀察正交矩陣的幾何結(jié)構(gòu),最終找到了任意維數(shù)的隨機(jī)正交矩陣的參數(shù)表示方法,通過分析相關(guān)超平面之間的垂直關(guān)系和參數(shù)化正交矩陣需要的參數(shù)個數(shù),論證了這種表示的完備性。