lattice group 中文意思是什麼
lattice group
解釋
點陣組-
Consisting of the protracting graph of hydrogen - like atom ' s angle distributing, computer simulation of the symmetry of molecular orbital and chemical reaction mechanism, showing the molecular point group and symmetry element, computer simulation of molecular vibration, bravias ' s crystal lattice and their transforming, extracting of plane periodic lattice, extracting of solid periodic lattice, close packing of isometrical pellet and the structure of simple mental substance, close packing of unequal pellet and crystal structure of representative ionic crystal, computer simulation of phase analysis by x - ray diffraction
內容包括類氫原子角度分布圖的繪制,分子軌道對稱性和反應機理的微機模擬,分子點群和對稱元素顯示,分子振動運動的微機模擬,布拉維晶格和晶格轉化,平面點陣抽取,立體點陣抽取,等徑網球的密堆積和金屬單質結構,不等徑圓球密堆積和典型離子晶體結構, x射線多晶衍射的微機模擬十個子模塊。 -
The effect of coordination number on phase transition point from the study of renormalization group calculation for hexagonal lattice
從六角格子的實空間重整化群計算看配位數對相變點的影響 -
In the third chapter, connected with the cube lattice model, we present the steps of the renormalization group and indicate the corresponding relationship between the fixed points of the renormalization group and the critical points
在第三章中結合立方晶格模型介紹了基於泛函積分的重整化群方法的幾個步驟以及重整化群中的固定點和臨界點的對應關系。 -
Alloy fabricated by arc melting consists of continuous nbssi matrix and dispersive distributed nb particles. the metastable nbasi phase is found to have a tetragonal crystal structure with space group p42 / n and lattice parameters a = 1. 021nm, c = 0. 519nm
O 0 )金屬間化合物的顯微組織由連續的nb3si基體、彌散分佈的nb粒子組成,其中亞穩態相nb3si為四方結構,空間群p42 n ,點陣常數a l -
Another phase, the high temperature phase, is hexagonal with space group p - 62m, which is stable from 300 to 800. the lattice parameter and the full width of half maximum ( fwhm ) of xrd peaks of u3o8 were also investigated at different temperature, and it were found that they change with the temperature under rules
在兩種相結構各自穩定的溫度范圍內, u _ 3o _ 8的點陣參數以及衍射峰半高寬( fwhm )出現了有規律的變化,這種變化表明u _ 3o _ 8的晶體結構依賴于環境溫度的變化。 -
A study of the simple cubic lattice bond percolation problem on the renormalization group approach
簡立方格子鍵滲流模型的重整化群方法研究 -
The renormalization group calculation for square lattice of double layer
模型的重整化群計算 -
It is shown that if l is a modular lattice with finite length, and with 0, 1 the least and the largest elements in l respectively, then 1 is the union of some minimal elements in l if and only if 0 is the intersection of some maximal elements in l, if and only if each non - zero element in l is the union of some minimal elements in l. by using these results, we give the necessary and sufficient conditions of an algebra module, module, ring, group and semigroup, respectively, to be semisimple
最後得出有限生成的ps -系是noetherian ( artinian )系的充要條件是它關于本質子系滿足升鏈(降鏈)條件。第二章給出了一個模格是半單的若干充要條件。得到:有有限長度的模格l上,最大元1是若干極小元的並當且僅當最小元0是若干極大元的交,當且僅當l中任意非零元可表示為若干極小元的並。 -
3. a new tsaw model are proposed, we use the real space renormalization group approach to treat the model on square lattice. the threshold kc and the fractal dimension d are obtained respectively
我們提出了一種新的自迴避行走模型(飛蟻模型) ,用重整化群方法計算了該模型的臨界值和分形維數分別為kc = 0 . 545069 、 d = 0 . 814909 。 -
These values are the critical exponents of three - dimension site - lattice. we study the two - dimension triangular - bond lattice percolation with next - nearest - neighbor interactions on the renormalization group approach as well
另外,我們採用位置空間重整化群方法,對二維次近鄰三角格子鍵滲流模型進行了研究。 -
In the second chapter, combined with the two - dimension triangle lattice ising model, we show the procedures of the renormalization group methods and illustrate how to apply these methods to solve critical exponent in detail
在第二章中結合二維三角形晶格伊辛模型詳細地介紹了重整化群方法的步驟以及如何應用重整化群方法來求解臨界指數。 -
The real - space ( or position - space ) renormalization group method is close to fractal and is widely used in geometric phase transition systems without hamilton, for example, seepage, lattice animal and random walk
實空間(位置空間)重整化群方法與分形有密切的關系,在不具有哈密頓的幾何相變系統,如滲流,晶格動物,無規行走等廣泛地被應用。
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