quantum algebra 中文意思是什麼
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After shortly reviewed the haldane ' s description of the quantum hall effect on 2 - sphere s2 and zhang and hu ' s generalization to 4 - sphere 54. we obtained the corresponding noncommutative algebra an and the moyal structure of the hilbert space
在回顧了haldane在2維球面s ~ 2上對量子hall效應的描述和張首晟與胡江平對量子hall效應在4維球面s ~ 4上的推廣后,我們構造了s ~ 2和s ~ 4上的非對易代數及其hilbert空間的moyal結構。 -
The procedure is as follows : after the modeling of the electron quantum bit system and the control field, applying the lie - algebra, the control output is calculated by analogy with the classical optimal control method to achieve the target
建立了該量子比特系統及其控制場的模型,藉助李群李代數,由經典最優控制的思想來獲得最優控制,從而實現了電子自旋量子系統任意量子態的最優制備。 -
Since c. n. yang [ 1 ] and r. j. baxter separately established quantum yang - baxter equation in 1960s, the investigations on quantum integrable models have been greatly promoted. especially the theory of yangian and quantum algebra theory that were established by v. g. drinfeld offered a powerful mathematic method for the reach about the symmetry of quantum integrable models in physics
自從楊振寧和r . j . baxter分別於1967年與1972年創建了量子楊-巴克斯特方程以來,量子可積模型方面的研究取得了很大進展,特別是v . g . drinfeld所建立的yangian和量子群理論對物理中的量子完全可積模型的對稱性研究提供了強有力的數學工具。 -
C. n. yang [ 1 ] and r. j. baxter [ 2 ] separately established quantum yang - baxter equation ( for short, qybe ) in 1960s. since then the investigations on quantum integrable models have been greatly promoted. worthy of mention especially is that the yangian and quantum algebra was established by v. g. drinfeld [ 7 - 9 ] in 1985 that offer a cogent mathematic method for the studies about the symmetry of quantum integrable models in physics
十九世紀六、七十年代以來,楊振寧和r . j . baxter分別創建了量子楊-巴克斯特方程(簡稱qybe ) ,極大的推動了有關量子可積模型方面的研究,特別是v . g . drinfeld所建立的yangian和量子群理論對物理中的量子完全可積模型的對稱性研究提供了強有力的數學工具。 -
In this paper, we mainly apply the theory of yangian to quantum mechanics, studying the quantum transition of a quantum system with quantum degenerate states by means of yangian algebra
本論文主要是將yangian理論應用量子力學之中去,利用yangian代數的方法來研究一種量子簡並態體系的量子躍遷。 -
Geometric algebra analysis of quantum pure state and mixed state
量子純態與混合態的幾何代數分析 -
The orthogonality basis of geometric algebra is used to convert the quantum master equation into state space model ; the equation is divided into several parts matrix is analyzed to show its compact on the evolution and the dynamics of the system
本文從量子主方程模型出發,選取一組合適的完備正交基將主方程模型轉化為實向量空間上的利於設計控制方案的狀態空間模型,並基於此模型針對一個典型的二能級量子系統設計最優控制方案,模擬結果驗證了方案的有效性。 -
After analyzing the process of mathematization, several conclusions are summed up as follows. first, while the subjects investigated of 17th century ' s mathematics include the mixture of the structure of sequence, the structure of algebra and the fuzzy quantum in the structure topology
首先,十七世紀數學的研究對象是一個包含代數結構、序結構和拓撲結構的模糊的「量」的混合體,而主要的內容是有別于古典幾何的無窮小演算法。 -
The su ( 1, 1 ) lie algebra is of great interest in quantum optics because it can characterize many kinds of quantum optics systems
廣義su ( 1 , 1 )相干態su ( 1 , 1 )李代數能表示許多量子光學系統,所以它在這個領域內引起了人們極大的興趣。 -
Based on the equation of su ( 2 ) algebra dynamic, the chaos problem is discussed in the linear su ( 2 ) nonautonomous quantum system. and a very important and interesting result is found that the complementary chaos phenomenon exists in the system. besides, the box dimension of fractal graph is calculated
利用su ( 2 )代數動力學方程討論了su ( 2 )線性非自治量子系統中的混沌問題,並且發現了一個非常重要而有趣的結果: su ( 2 )線性非自治量子系統中存在著互補混沌,同時計算了分形圖形的記盒維數。
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