量子諧振子 的英文怎麼說
中文拼音 [liángzixiézhènzi]
量子諧振子
英文
quantum harmonic oscillator- 量 : 量動1. (度量) measure 2. (估量) estimate; size up
- 子 : 子Ⅰ名詞1 (兒子) son 2 (人的通稱) person 3 (古代特指有學問的男人) ancient title of respect f...
- 諧 : Ⅰ形容詞1 (和諧) in harmony; in accord; in tune 2 (詼諧) humorous Ⅱ動詞(商量好; 辦妥) come t...
- 振 : 動詞1. (搖動; 揮動) shake; flap; wield 2. (奮起) brace up; rise with force and spirit
- 量子 : quantum; gion
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The eigenvalue and eigenfunction of a coupled quantum oscillator
二維耦合量子諧振子的本徵值和本徵函數In this section we will increase our quantum-mechanical repertoire by solving the schroedinger equation for the one-dimensional harmonic oscillator.
本節我們將用求解一維諧振子的薛定諤方程以提高我們的量子力學技能。Symmetry in spectrum space of isotonic oscillator and two - photon parametric model
同調諧振子譜空間上的對稱性和參量雙粒子模型The negative sign means that energy is transferred from the oscillator to its environment.
負號的意思是能量由諧振子傳遞到它的環境。Solve energy eigenvalue of the double harmonic oscillator by momentum coupling
求解動量耦合下兩諧振子體系的能量本徵值問題At the same time in terms of su ( 1, 1 ) algebra, the eigenequations of two and three - dimensional harmonic oscillator and hydrogen atom with inverse square potential are conversed into the same equations in form. then the relationships between energy levels and wave functions of them are found
同時本文利用su ( 1 , 1 )代數將二維、三維情況下的諧振子同加了反平方勢的氫原子分別表示成具有相同形式的兩算符下的本徵值方程,從而得出他們的能量對應關系。By use of the relationships between the hermite polynomial and the laguerre polynomial, the eigenequations of one - dimensional harmonic oscillator and hydrogen atom are conversed into the same equations in form. therefore the relationships between energy levels and wave functions of one - dimensional harmonic oscillator and hydrogen atom are found. through the coordinates transform, the relationships between energy levels and wave functions of two - dimensional harmonic oscillator and hydrogen atom are found
首先綜述了諧振子與氫原子的基本理論的研究現狀,並在此基礎上對諧振子與氫原子的關系展開了研究,通過厄密特方程與拉蓋爾方程的相互轉化,將一維諧振子與一維氫原子的本徵值方程轉化為相同形式的方程,從而比較得出它們能量及波函數間的關系,並通過坐標變換將直角坐標系下二維氫原子的本徵值方程轉化成與曲線坐標系下二維諧振子的本徵值方程相同的形式,從而得出二維氫原子與二維諧振子的能量及波函數的關系。In this paper, we study the vdw ( c6h5ch3. . n2 ar ) vibrations in complexes by using a combined experiment and theoretical studies of resonant ionization spectra. for complexes, vdw vibration levels are calculated by the quantum method of linear - combination of three - dimensional harmonic oscillator products and lennard - jones potential, which is very close to the experimental spectrum
本文採用理論和實驗的方法對vdw復合物c _ 6h _ 5ch _ 3 … n _ 2 、 ar進行了研究,並用三維線性諧振子波函數和納能-瓊斯勢函數的量子計算方法得出vdw復合物的振動能級,計算值和實驗光譜相符合。In this paper, the wavefunction is expanded in terms of the two - dimensional harmonic oscillator eigenfunction and the mismatch of the effective mass is considered. we calculate the energy of the ground state, the energy of the first excited state and the oscillator strength of the single electron in a square quantum wire with finite barriers
本文選取了以二維諧振子本徵函數為基展開的波函數,並且考慮了有效質量的失配性,計算了有限深方形量子線中單電子的基態能,激發態能和振子強度。At the same time, the coordinate representation also can be exploited in calculating thermal non - classical states recently, such as coherent state. basing on the correlative theory, and within the framework tfd, we calculate rindler oscillator ' s information - entropy in the coordinate representation, and discuss the relation of its general uncertainty relationship and information - entropy, especially the relation of its thermal fluctuation and information - entropy
在相關理論的基礎上,本文一方面利用熱場動力學,在坐標表象下計算出了與一維rindler諧振子的位子和動量有關的信息熵,並給出了信息熵與一維rindler諧振子的廣義測不準關系,特別是與熱擾動之間的聯系。The orientation state of the molecule can be described by angular momentum eigenstate of the molecule rotating around its long axis ; the state of the molecule center - of - mass can be described by energy eigenstate of the particle in the harmonic well potential
)和分子質心位矢( ? ) 。分子取向態可用分子繞長軸自轉角動量本徵態描述;分子質心態可用質點在諧振子勢阱中的能量本徵態來描述。Some kinds of the supersymmetric quantum mechanics systems related to the three - dimensional isotropic harmonic oscillator
三維各向同性諧振子的超對稱量子力學體系The fluctuations of its displacement and momentum at zero - point are also given
方法的可靠性及阻尼諧振子的坐標、動量的零點漲落亦得到討論。The damped harmonic hamiltonian is infered from harmonic hamiltonian, by introducing the canonical transformation
從線性諧振子哈氏量出發,通過正則變換,得到了受迫阻尼諧振子哈氏量。Then we construct the corresponding transfer matrix to determine the rtt integrability of dirac oscillator and gain the conserved quantities of the system according to quantum determinant
接著構造出相應的整體轉移矩陣,確定dirac諧振子在rtt意義下的量子可積性的問題,並由量子行列式確定體系的守恆量族。In addition, the specific heat c have been manipulated under control of dimensionality, i. e the chemical potential have been discussed in lower - dimension system. the results is interesting that, dose not intend to fermi energy f when temperature is very low in 2d, whereas is a constant in 1d
對于低維情況的化學勢的討論,我們得到:在二維情況下,當溫度很低時,化學勢不再趨于fermi能量;在一維情況下,為常數(諧振子勢場的頻率一定) 。Based on the thomas - fermi approximation, the finite number effect, along with dimensionality, has been discussed for a bose system and fermi system trapped in 3d, 2d, 1d anisotropic harmonic oscillator potential, without considering the inter - atom interaction. we indeed found the remarkable differences between the finite number case and the thermodynamical case, including dimensionality
基於thomas - fermi近似,在不考慮原子間相互作用的前提下,我們分別對處於三維、二維、一維諧振子勢場中的bose體系和fermi體系的熱力學性質作了詳細的討論,並得到了有限粒子數效應下熱力學量和臨界溫度的修正。Second, we try to find another kind of realization of yangian so that we can study the symmetry of this system based on a different point of view. we find that there is yangian symmetry in dirac oscillator, as a result, we are able to shift one degenerate state to anther in the same energy level. then we construct the corresponding transfer matrix to determine the rtt integrability of dirac oscillator
然後,本文尋找dirac諧振子的另外一種yangian實現形式,從另一個角度研究該體系的對稱性,從而表明dirac諧振子這里這種實現下具有yangian對稱性,這樣,我們可以實現在同一個能級的不同簡並態之間的躍遷,再構造出相應的整體轉移矩陣,確定dirac諧振子在rtt意義下的量子可積性的問題。Energy and wave function of the two dimensional harmonic oscilltor and hydrogen atom
二維諧振子與二維氫原子的能量及波函數關系Energy relation between two - dimensional harmonic oscillator and hydrogen atom in inverse square potential
二維諧振子與加反平方勢的二維氫原子的能量關系分享友人