Sakurai Definition and 79 Threads

  1. O

    How Does the Transformation in Sakurai's Quantum Mechanics Work?

    The following is from 'Modern Quantum Mechanics' by J.J. Sakurai, page 159. \left( \frac{ \hbar }{ 2 } \right) \exp \left( \frac{i S_{z} \phi}{\hbar} \right) \left{ left( \mid + \rangle \langle - \mid \right) + \left( \mid - \rangle \langle + \mid \right) right} \exp \left( \frac{- i S_{z}...
  2. E

    Unknown well-known equation in Sakurai

    Unknown "well-known" equation in Sakurai On p391 in Modern Quantum Mechanics is stated: Now we use the well-known equation: \frac{1}{E - H_0 -i \epsilon} = Pr. \left( \frac{1}{E-H_0} \right) + i \pi \delta \left(E-H_0 \right) Frankly I've never heard of the equation or the notation Pr. My...
  3. M

    Sakurai Quantum Mechanics Problem 29 Explained

    Homework Statement I have attached a link to the solution set of some questions from sakurai. But I don't understand clearly the solution of question number 5.29. link: http://www.people.virginia.edu/~7Erdb2k/homework/phys752/quantum.pdf" Homework Equations how did they found the 4x4 matrix...
  4. E

    What Sakurai Topic Best Connects Quantum Mechanics to Nuclear Physics?

    In our course covering some parts of Sakurai's Modern Quantum Mechanics we have a special exam. We must present a topic from the book not covered in class to our professor in half an hour. I'm not that familiar with the book yet, because I've had many project due this semester. So I'm uneasy...
  5. B

    Sakurai pr. 1.18 - bra-c-ket sandwiches

    Homework Statement c) explicit calculations, using the usual rules of wave mechanics, show that the wave function for a Gaussian wave packet given by \left\langle {x'|\alpha } \right\rangle = {(2\pi {d^2})^{ - 1/4}}\exp \left( {{\bf{i}}{\textstyle{{\left\langle p \right\rangle x'} \over...
  6. B

    Sakurai, p. 59, Pr 1.6 - critique the proof

    Homework Statement Suppose that |i> and |j> are eigenkets of some Hermitian operator. Under what condition can we conclude that |i> + |j> is also an eigenket of A? Justify your answer.Homework Equations It seems that all that is needed is for "A" to be a linear operator and for |i> and |j> to...
  7. B

    Working with Hermitian-Adjoint - Sakurai Problem 1.4b

    Homework Statement Not relevant, but I have some work that reaches incorrect conclusions, and I can't see the mistake "in the middle". Homework Equations The Attempt at a Solution \begin{array}{l} {(XY)^\dag } = {\left( {\left\langle {a'} \right|X\left| {a''} \right\rangle...
  8. B

    Proving Tr(XY) = Tr(YX) (Sakurai, p. 59, prob. 1.4)

    Homework Statement You know {\rm{Tr}}(XY) = \limits^{?} {\rm{Tr}}(YX), but prove it, using the rules of bra-ket algebra, sucka. (The late Sakurai does not actually call his reader "sucka"). Homework Equations {\mathop{\rm Tr}\nolimits} (X) \equiv \sum\nolimits_{a'} {\left\langle {a'}...
  9. B

    What is the Sakurai Equation (1.6.26) and how is it used in quantum mechanics?

    Homework Statement This isn't a homework problem. I am reading Sakurai (Modern Quantum Mechanics) and came upon this:
  10. B

    Sakurai Problem 1.12: Probability of Getting +h/2

    Homework Statement A spin ½ system is known to be in an eigenstate of \textbf{S}\cdot\hat{\textbf{n}} with eigenvalue \frac{\hbar}{2} , where \hat{\textbf{n}} is a unit vector lying in the xy-plane that makes an angle γ with the positive z-axis. a. Suppose S_x is measured. What is the...
  11. Q

    Compare the following books - Griffiths, Sakurai, Shankar

    Ok, maybe the subject has been discussed in some manner in other posts, but I would like a clear comparison between : * David J Griffiths - Introduction to Quantum Mechanics * Shankar - Principles of Quantum Mechanics * Sakurai - Modern Quantum Mechanics What is your experience with these...
  12. P

    Suitability of Sakurai for QM Learning

    Hi, I was advised to learn QM from Sakurai since I was interested in learning QM. However, my university's library doesn't have a copy so I can't look through it to decide if it is suitable. I am familiar with all the basic linear algebra (orthogonality, diagonalisation, eigenvectors...
  13. D

    Sakurai 2.17 - More elegant solution help?

    Problem Show for the one-dimensional simple harmonic oscillator \langle 0 | e^{ikx} | 0 \rangle = \exp{[-k^2 \langle 0 | x^2 | 0 \rangle / 2]} where x is the position operator (here, k is a number, not an operator, with dimensions 1/length). My Solution Well, I already know how to do this...
  14. Q

    Sakurai, Chapter 1 Problems 23 & 24

    Problem 23: If a certain set of orthonormal kets, |1> |2> |3> , are used as the base kets, the operators A and B are represented by A = \left( \begin{array}{ccc} a & 0 & 0 \\ 0 & -a & 0 \\ 0 & 0 &...
  15. Q

    Difficulty with Sakurai, Ch.1, Problem # 9

    Homework Statement Determine the eigenvector for (S \cdot \hat{n}) |eigenvector> = (\hbar)/2 |eigenvector> where S = (\hbar)/2 \sigma. The sigmas are the Pauli spin matrices and \hat{n} = sin\beta cos\alpha \hat{i} + sin\beta\ sin\alpha \hat{j} + cos\beta \hat{k} You have to solve for the...
  16. D

    Sakurai 1.27 - Transformation Operators

    Problem Suppose that f(A) is a function of a Hermitian operator A with the property A|a'\rangle = a'|a'\rangle. Evaluate \langle b''|f(A)|b'\rangle when the transformation matrix from the a' basis to the b' basis is known.The attempt at a solution Here's what I have... I'm not sure if the last...
  17. D

    Sakurai 1.17 - Operators and Complete Eigenkets

    I'm pretty sure this is correct, but could someone verify for rigor? Problem Two observables A_1 and A_2, which do not involve time explicitly, are known not to commute, yet we also know that A_1 and A_2 both commute with the Hamiltonian. Prove that the energy eigenstates are, in general...
  18. G

    Solve Sakurai 1.27: Evaluate $\langle \mathbf{p''} | F(r) | \mathbf{p'} \rangle$

    Homework Statement (Sakurai 1.27) [...] evaluate \langle \mathbf{p''} | F(r) | \mathbf{p'} \rangle Simplify your expression as far as you can. Note that r = \sqrt{x^2 + y^2 + z^2}, where x, y and z are operators. Homework Equations \langle \mathbf{x'} | \mathbf{p'} \rangle = \frac{1}{ {(2 \pi...
  19. A

    QM Sakurai 1.9 - Problem at last step only

    Homework Statement http://www.ocf.berkeley.edu/~yayhdapu/postings/sak19.gif Homework Equations The Attempt at a Solution http://www.ocf.berkeley.edu/~yayhdapu/postings/sakurai1.9.pdf" http://www.ocf.berkeley.edu/~yayhdapu/postings/sakurai1.9.docx" These are here in this attached...
  20. D

    Quantum Mechanics: Fitzpatrick's Online Grad Course vs. Feynman & Sakurai

    Just out of curiosity, how hard is Fitzpatrick's online Graduate version of quantum mechanics compared to the Feynman lectures and Sakurai's book?
  21. J

    How to Prove the Commutator Relation for Quantum Spin Operators?

    Homework Statement Using the orthonormality of |+\rangle and |-\rangle, prove [S_i,S_j]= i \varepsilon_{ijk}S_k where S_x = \frac{\hbar}{2}|+\rangle \langle - | + | - \rangle \langle + | S_y = -\frac{i\hbar}{2}|+\rangle \langle - | + | - \rangle \langle + | S_z =...
  22. J

    How to Evaluate \exp (i f(A)) in Ket-Bra Form for a Hermitian Operator?

    Evaluate \exp (i f(A)) in ket-bra form, where A is a Hermitian operator whose eigenvalues are known. \exp (i f(A)) = \exp(i f(\sum_i a_i \langle a_i |)). I'm a little bit stuck on where to go from here. Is f supposed to be a matrix values function of a matrix variable or what?
  23. J

    Sakurai Ch.3 Pr.6 - Commutation Rules & Angular Momentum

    [SOLVED] Sakurai Ch.3 Pr.6 Homework Statement Let U = \text{e}^{i G_3 \alpha} \text{e}^{i G_2 \beta} \text{e}^{i G_3 \gamma}, where ( \alpha , \beta , \gamma ) are the Eulerian angles. In order that U represent a rotation ( \alpha , \beta , \gamma ) , what are the commutation rules...
  24. L

    Solved Problems for Sakurai Advanced QM - Leticia

    Does someone know a site with Sakurai (Advanced QM) solved problems? Thanks in advance, Leticia
  25. malawi_glenn

    Is This the Correct Solution for Sakurai Ch 2 Problem 14.b?

    Homework Statement Consider a one-dim harm osc; start with the Schrödinger equation (SE) for the state vector, then derive the SE for the momentum-space wave function. The Attempt at a Solution My answer is this, all primed letters are numbers (as in sakurai notation). Its going to...
  26. D

    Sakurai Problem 1.9: Eigenvalues of Hamiltonian

    Of Modern Quantum Mechanics. This starts with a Hamiltonian H = a(|1\rangle\langle 1| - |2\rangle\langle 2| + |1\rangle\langle 2| + |2\rangle\langle 1|) This has eigenvalues \pm a\sqrt{2}. Shouldn't a Hamiltonian have only non-negative eigenvalues? If the sign in front of the...
  27. H

    Sakurai Problems - strange notation

    Hello! I'm just doing the Problems of Chapter 1 of Sakurai: Modern Quantum Mechanics. On page 60, problem 2 he writes: "Suppose a 2x2 matrix X, (not necessary Hermitian, nor unitary) is written as X = a_0 + \mathbf{\sigma \cdot a} , where a_0 and a_{1,2,3} are numbers." which confuses...
  28. H

    Find Free Ebooks on Physics: Quantum Mechanics by J.J. Sakurai

    Where can i find free ebooks about physics ? For example quantum mechanics by j.j.sakurai
  29. H

    Where Can I Find Solutions to Sakurai's 'Modern Quantum Mechanics' Exercises?

    I hope this is not off-topic here: I remember I had seen a time ago somewhere in internet the solutions to the excercises of Sakurai's book 'Modern Quantum Mechanics', but I am not able to find the link again. Anyone knows? Thanks.
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