線性秩 的英文怎麼說
中文拼音 [xiànxìngzhì]
線性秩
英文
linear rank-
The signal we named it fundamental wave ; according to the fundamental wave, coefficients of the fundamental wave can be lined in a sequence. when the unique of the dissolve of the fundamental wave can be confirmed, the sequence of the coefficients can be regarded as one of representation forms of the signal itself ; theory of dissolvable signal shows that when order of the matrix of fundamental wave sampling equals to number of fundamental waves, the sequence of the sampling values from sampling points must be matched one by one with the sequence of the coefficients of fundamental waves. the sampling composed by sequences of the sampling values must be full sampling ; the relevant deductions of the theory of dissolvable signal shows that when sampling the signal, sampling frequency must be lager than the ratio of the number of fundamental waves to the occupation time of the fundamental waves ; to band - limited signals, when the fundamental wave is a sine signal, the results from the relevant deductions of theory of dissolvable signal is coherent to the classic sampling theory
本文通過分析認為,當信號集中的任一信號可表示為一系列已知信號的線性代數和時,信號集便構成可分解信號集,已知信號稱為基波信號;對可分解信號而言,基波系數構成一序列,當對指定的基波信號集分解唯一確定時,系數序列本身便是信號的一個表示;可分解信號采樣定理指出當基波樣值矩陣的秩等於基波數時,則由采樣點處的采樣樣構成的樣值序列必與基波系數序列一一對應,從而由該樣值序列構成的采樣必為完全采樣;可分解信號采樣定理中的推論指出,對信號集進行采樣,采樣頻率必須大於其信號分解的基波數與其對應時長之比;對有限帶寬信號,若基波信號為正弦信號時,由可分解信號采樣定理推論給出的結論與經典采樣定理一致。In this paper we first give the definition of a type of block upper triangular matrix algebras and then characterize linear surjective maps that preserve rank one from one block upper triangular matrix algebra of this type to another
本文的主要結果是確定了一類分塊上三角矩陣代數的保持秩一的線性滿射。本文首先定義了一類分塊上三角矩陣代數( c ) ,然後確定了保持秩一的線性滿射。Without a receptacle, these creative cosmic rays would create chaos and confusion
如果沒有一個容器,這些創造性的宇宙射線將引起混亂和無秩序。Could reflect the tendency relationship between two genes, while information entropy and fuzzy corr. coef. could reflect the dependency relationship of regulation
線性相關系數和秩相關系數可以體現基因表達調控的趨勢性,信息熵相關系數和模糊相關系數反應調控的依賴關系。We define the rank of a matrix as the number of linearly independent rows which it contains.
我們把這個矩陣的秩定義為它所包含的線性無關行的數目。We give a new method to measure the model ' s nonlinearity. at last, we extend the mode to unnomal non - full - rank case, and discuss the estimate property of a more generlized separated nonlinear model
最後,將本模型推廣到非正態,列降秩的情形,並研究了更為一般的可分離非線性模型的參數估計及非線性度量。On the basis of the homotopy arithmetic, this paper puts forward a uniform model of nonlinear least square ( ls ) adjustment, which can be used not only for the nonlinear ls adjustment of the rank defect problems, but also for that of the rank full problems
摘要基於非線性同倫思想,提出了非線性同倫最小二乘平差統一模型,該方法既可適用於滿秩網非線性最小二乘平差,也可適用於秩虧網非線性最小二乘平差。Linear operators preserving the minimal rank over matrix space
關于矩陣空間上保持極小秩的線性運算元The independence of two d - dimensional random vectors is tested by employing the linear rank statistics based on depth function
利用基於深度函數的線性秩統計量檢驗兩d維隨機向量的獨立性。5. the position and scale problem of two d - dimensional samples is discussed by using the linear rank statistics based on depth function
5 、利用基於深度函數的線性秩統計量討論兩d維樣本尺度與位置問題。Since linear rank statistics has the most popularity in application in nonparametric statistics, this article fabricate the linear rank statistics based on depth function, and discussed its asymptotic property and application. particular result is as follows : 1
由於線性秩統計量是非參數統計中應用最廣的一類統計量,所以本文構造了基於深度函數的線性秩統計量,並對其漸近性質和應用做了一些研究,具體結果如下: 1His students and cooperators construct geometric lattice by means of linear spaces, and discuss the geometric lattice that generated by various orbits or subspaces with the same dimension or rank under the action of classical groups over finite field. but the results on geometric lattice constructed by using matrices are very few. in the present paper, we construct geometric lattice with idempotent matrix
在國內,萬哲先與他的學生和合作者們利用線性空間的辦法,討論了在有限域上的典型群作用下,由各個軌道或相同維數和秩的子空間生成的幾何格。但是,利用矩陣構造幾何格結果很少。Thirdly, based on the thought of motion - based ambiguity resolution, a bi - satellite attitude determination method using non - planar baselines is developed making full use of the satellites ’ geostationary property. focused on movement mode demands, the dissertation brings forward a method by large angle yawing movement accompanied with small angle pitch vibration to efficiently solve the rank deficiency problem of vehicle planar motion
再次,在基於運動解模糊的思想基礎上,充分利用北斗衛星對地靜止的特性,提出了一種非共面基線的雙星定姿方法,並重點分析了對運動特性的要求,提出通過伴隨小幅俯仰擾動的大角度偏航運動方式來有效解決載體平面運動的觀測矩陣秩虧問題。At the moment, there are most reductionism ' s method as in the mentioned researches above, i. e., investigating rule ' s game and order ' s change by based on main trend theory ' s frame, utilizing linearization model and in established ways of rule and order
目前,有關這方面的研究大多採取「簡約主義」 ( reductionism )的方法,即基於主流理論的框架、用線性化的模式、在既定的規則和秩序的架構中,研究規則博弈和秩序變化。This paper applied the character that linear subjective isometries preserve the geometric rank of a operator to characterize the onto isometries between compact operators space in weakly closed modules of nest algebras, and obtained the expressions of the isomtries
摘要利用運算元的幾何秩在線性等距映射下不變的性質研究了套代數弱閉模中緊運算元空間的線性等距離映射,最後得到其空間實現形式。Thirdly, the analysis method for nonlinear system using rank factor of observability and singular value decomposition are proposed, and navigation observability is analyzed
第三,給出觀測矩陣秩條件及矩陣奇異值分解的非線性系統可觀性分析方法,對自主導航系統進行可觀性分析。In the part of discussion, the suitability of the jacobi elliptic function expansion method is also studied by proposing the " rank ". and we firstly point out that when the " ranks " of every term of the nonlinear evolution equation are simultaneously even or odd, the method can be used to solve the equation
為了討論了jacobi橢圓函數展開法的適用性問題,我們最先引進「秩」的概念,指出只要非線性發展方程的各項的「秩」滿足相同的奇偶性,就可以用這種展開法求解。There is a natural linear order relationship among the data of one - dimensional sample, so which can be ordered according to the size of the sample points, however, since there is no natural linear order relationship among data of multi - dimensional sample, it is impossible to gain multi - dimensional order statistics in accordance with the order of the size of sample, neither is it impossible to extend many useful methods for one - dimensional nonparametric oiatistics to those for high dimensional ones
對於一維樣本,由於數據之間存在一種自然的線性序關系,故可按照樣本的大小排序,從而得到秩向量。但對于多維樣本,數據之間則不存在自然的線性序關系,無法按照樣本的大小排序而得到高維樣本的次序統計量並由此把一維非參數統計的許多有用的方法直接推廣到高維情形,使得對多元數據的統計分析十分麻煩。分享友人