Consider a Hamiltonian ofthe form: H=H. +AR, where 2 4) 4 -1 0-E a) Calculate the energy eigenval...
Consider a quantum mechanical system with 4 states and an unperturbed Hamiltonian given by 1 0 0 0 Ho E0 0 2 0 a small perturbation is added to this Hamiltonian 0 0 1 0 where e is much smaller than E a) [10pts] What are the energy eigenvalues of the unperturbed system of the following states? 1 o 2o 0 and which energy levels are degenerate? b) [10pts Find a good basis for degenerate perturbation theory instead of c)...
(3)Consider an atomic p-electron (-1) which is governed by the Hamiltonian H-Ho +Hl,where Ho=a L,.bhand H,-./2 where a,bandcare nonzero real numbers with a 굶b. (a) Determine the Hamiltonian in Matrix form for a basis | I,m > with 1-land ,n = 0,±1. You may use the formula (b)Treat H,as a perturbation of Ho. What are the energy eigenvalues and eigenfunctions of the unperturbed problem? (c)Assume as>lcl and bsslcl. Use perturbation theory to calculate eigenvalues of H to first non trivial...
Quantum mechanics. A Hamiltonian of the form , is equivalent to the Hamiltonian of a harmonic oscillator with its equilibrium point displaced where and C are constant, find them. With the previous result, find the exact spectrum of H. Calculate the same spectrum using the theory of disturbances to second order with . Compare your results. Calculate the wave functions up to first order using as a perturbation. P2 22 P2 Tm We were unable to transcribe this imageWe were...
is A system with an unper tubed Hamiltonian H Subjected to a perturbation HC Mon , 3 . • Il (1 1 . i eil 2 0 ; H = da o vz; 0 0 -2 0 II 131 l-ai vei o 2, where a is a real Constant with The dimesions of an energy anda is a dimension less real Constant. as show that the following vectors are the eigen vectors of M" and determine their associated eigenvalues. 14>*3)...
3. Consider a system whose Hamiltonian H, admits two eigenstates y, (with eigenvalues F) and v, (with eigenvalues E,). Assume E, E, and they are () orthogonal, (ifi) normalized and (ii) non-degenerate. After the perturbation is on the diagonal matrix elements become zero ie, <4, l H'l Ψ)-(4, I H'ly,)-0, while the off diagonal equals to a constant value ie. (v, l H'l%)-(wil H'ly)-c Using the 2nd order perturbation theory evaluate the energy of the perturbed system.
Q10 The Hamiltonian of a two-state system is given by H E ( i)- I02)(2 | -i | ¢1)(2 | +i | ¢2) (¢1 1) where , p2) form a complete and orthonormal basis; E is a real constant having the dimensions of energy (a) Is H Hermitian? Calculate the trace of H (b) Find the matrix representing H in the | øı), | 42) basis and calculate the eigenvalues and the eigenvectors of the matrix. Calculate the trace of...
(introduction to quantum mechanics) , the Hamiltonian matrix is H- 3. In the basis |1) - (a) Find the eigenvalues En and eigenfunctions Ion) of H. (b) The system is in state 2) initially (t 0). Find the state of the system at t in the basis n). (c) Calculate the expectation value of H. Briefly explain your result. Does it depend on time? Why? , the Hamiltonian matrix is H- 3. In the basis |1) - (a) Find the...
quantum mechanics Consider a particle confined in two-dimensional box with infinite walls at x 0, L;y 0, L. the doubly degenerate eigenstates are: Ιψη, p (x,y))-2sinnLx sinpry for 0 < x, y < L elsewhere and their eigenenergies are: n + p, n, p where n, p-1,2, 3,.... Calculate the energy of the first excited state up to the first order in perturbation theory due to the addition of: 2 2 Consider a particle confined in two-dimensional box with infinite...
Let Ho be the Hamiltonian of the non-relativistic hydrogen atom neglecting spin. Consider H1 = e|E\r cos 0 with e|E|af < 1. This Hamiltonian describes a weak constant electric field in the z-direction interacting with the atomic dipole. We want to understand the effect such a field has on the first excited energy level, E2, of hydrogen. Remember that this energy level is degenerate with corresponding eigenstates |2lm) Use first-order perturbation theory to find the aproximate energies of Ho+ H1...
quantum mechanics Calculate the eigenvalues and eigenvectors of the operator: (2) 0 1 Nowconsidertheoperatorơ-o,ag)where-f ) 1 3 By using the perturbation theory to first order in 2, calculate the eigenvalues and the eigenvectors of σ Calculate the eigenvalues and eigenvectors of the operator: (2) 0 1 Nowconsidertheoperatorơ-o,ag)where-f ) 1 3 By using the perturbation theory to first order in 2, calculate the eigenvalues and the eigenvectors of σ