Physics 3 for Electrical Engineering

Ben Gurion University of the Negev www.bgu.ac.il/atomchip,www.bgu.ac.il/nanocenter Physics 3 for Electrical Engineering Lecturers: Daniel Rohrlich, Ron Folman Teaching Assistants: Daniel Ariad, Barukh Dolgin Week 10. Quantum mechanics – Schrödinger’s equation for the hydrogen atom • eigenvalues and eigenstates • atomic quantum numbers • Stern-Gerlach and spin • Pauli matrices • spin-orbit coupling Sources: Feynman Lectures III, Chap. 19 Sects. 1-5; Merzbacher (2nd edition) Chap. 9; Merzbacher (3rd edition) Chap. 12; פרקים בפיסיקה מודרנית, יחידה 8, פרקים 1-2 Tipler and Llewellyn, Chap. 7 Sects. 2-5.

Schrödinger’s equation for the hydrogen atom The most common isotope of hydrogen contains just one proton and one electron. Their potential energy is so Schrödinger’s equation depends on rp and re , i.e. on six coordinates: But a clever change of variables makes the equation simpler:

Schrödinger’s equation for the hydrogen atom Let r = re – rpand then Schrödinger’s equation becomes where is called the reduced mass. For a proton and an electron, the reduced mass is essentially the electron mass, since mp ≈ 2000 me. But for a positronium atom (which has a positron in the place of the proton), μ = me /2.

Schrödinger’s equation for the hydrogen atom Let r = re – rpand then Schrödinger’s equation becomes where is called the reduced mass. There are solutions of the form Ψ = T(t)χ(R)ψ(r), where T(t) is the usual time dependence and χ(R) is a solution to the free Schrödinger equation in R (the center-of-mass coordinate), which has no potential term.

Schrödinger’s equation for the hydrogen atom The equation for ψ(r) is then with the Coulomb energy as a central potential V(r). We have seen that, for a central potential, Schrödinger’s equation reduces to

We replace m by μ and V(r) by and obtain the eigenvalues of ; they are . We solved this equation by expressing ψ(r,θ,φ) as a product of two functions: ψ(r,θ,φ) = R(r)Ylm(θ,φ) , where

Eigenvalues and eigenstates Hence the equation for R(r) is The solutions Rnl(r) of this equation have the form with Fnl(r/a0) a polynomial and n ≥ l + 1. The constant a0 is called the Bohr radius and equals Å

Eigenvalues and eigenstates The energies depend only on n: where 1 eV = 1.602176 × 10-19 J. Question: What is the normalization condition for ψnlm(r,θ,φ)?

Eigenvalues and eigenstates The energies depend only on n: where 1 eV = 1.602176 × 10-19 J. Question: What is the normalization condition for ψnlm(r,θ,φ)? Answer:

Eigenvalues and eigenstates Question: What is the normalization condition for Rn0(r)?

Eigenvalues and eigenstates Question: What is the normalization condition for Rn0(r)? Answer:

n l m ψnlm Eigenvalues and eigenstates Here are the lowest normalized solutions ψnlm = Rnl(r)Ylm(θ,φ) of the hydrogen atom Schrödinger equation (see also here):

Radial eigenfunctions Rnl(r) and probability distributions Pnl(r) for the lowest eigenstates of the hydrogen atom. From here. Question: How can Pn0(r) vanish at r = 0 if Rn0(r) does not? Pnl(r) Rnl(r) Radius (a0)

Radial eigenfunctions Rnl(r) and probability distributions Pnl(r) for the lowest eigenstates of the hydrogen atom. From here. Question: How can Pn0(r) vanish at r = 0 if Rn0(r) does not? Answer: On a sphere of radius r, we have Pn0(r) = r2|Rn0(r)|2. Pnl(r) Rnl(r) Radius (a0)

For a single electron bound by a nucleus containing Z protons, the solutions of Schrödinger’s equation are almost unchanged; the reduced mass μ is even closer to me, while the potential term is Thus by replacing e2 with Ze2 in the eigenstates and eigenvalues we obtained for Z = 1, we obtain the Z > 1 eigenstates and eigenvalues. For example, we obtain the energy eigenvalues

Exercise: Show that the energy of the ground state is half the expectation value of the potential energy in the ground state.

Exercise: Show that the energy of the ground state is half the expectation value of the potential energy in the ground state. Solution: The ground state energy is The expectation value of the potential energy is

Atomic quantum numbers According to what we have seen so far, every eigenstate of the hydrogen atom can be associated with three quantum numbersn, l and m, where n = 1, 2, 3, … “principle” quantum number l = 0, …, n – 1; m = –l, –l +1, …, l – 1, l . The degeneracy of the energy eigenvalue En is therefore 1 + 3 + 5 + … + [2(n – 1) + 1] = n2 . In atomic physics, the l quantum numbers have special names: s for l = 0, p for l = 1, d for l = 2, f for l = 3, etc. Then 2s means n = 2 and l = 0; 3p means n = 3 and l = 1; and so on.

Since the energy of an electron in a stationary hydrogen atom can only be one of the En , where a stationary atom can absorb and emit photons only if the photon energy equals Ephoton = En – En’ . And since the energy of a photon is related to its frequency ν by Ephoton = hν, the frequencies of electromagnetic radiation emitted or absorbed by a hydrogen atom must obey the rule for some n and n´. This formula, derived by Bohr 13 years before Schrödinger, was soon verified via spectroscopy.

Energy levels for hydrogen, and transitions among the levels

Energy levels for hydrogen, and transitions among the levels Corresponding spectral lines

Light from source Setup for emission spectroscopy:

The “magnetic” quantum number m: When an atom is immersed in a uniform magnetic field, the energies En split! Let B be the strength of the field and let point up the z-axis. A state with quantum numbers n, l, m has energy where μB = eħ/2me is the Bohr magneton.How can we explain this effect? An electron moving in a circular orbit of radius r, at speed v, produces a current I = ev/2πr and a magnetic momentμz = I(πr2) = evr/2 = eLz/2me. Since Lz = mħ, we have μz = μBm. The corresponding extra potential term for the hydrogen atom is

The “magnetic” quantum number m: But this is not the only magnetic effect. In a uniform magnetic field, there is a torque on the atom (to make it anti-parallel to the magnetic field). But in a non-uniform magnetic field, there is also a force on the atom. Assume again that the field points up the z-axis, so that VB = –μz B. Then if dB/dz ≠ 0, the force is So, what happens if a beam of neutral atoms with –lħ ≤ Lz ≤ lħ crosses a non-uniform magnetic field?

The “magnetic” quantum number m: But this is not the only magnetic effect. In a uniform magnetic field, there is a torque on the atom (to make it anti-parallel to the magnetic field). But in a non-uniform magnetic field, there is also a force on the atom. Assume again that the field points up the z-axis, so that VB = –μz B. Then if dB/dz ≠ 0, the force is So, what happens if a beam of neutral atoms with –lħ ≤ Lz ≤ lħ crosses a non-uniform magnetic field? We expect the beam to split into 2l+1 beams, one for each value of μz. In some cases, the beam indeed splits into 2l+1 beams.

Stern-Gerlach and spin But O. Stern and W. Gerlach saw a beam of silver atoms split into two beams!

Stern-Gerlach and spin But O. Stern and W. Gerlach saw a beam of silver atoms split into two beams! How can have an even number of eigenvalues? G. Uhlenbeck and S. Goudsmit suggested that each electron has its own intrinsic angular momentum – “spin” – with only two eigenvalues. But electron spin has odd features. For example, its magnitude never changes, just its direction – and it has only two directions.

Stern-Gerlach and spin Let’s try to understand spin better by reviewing the algebra of Consider l = 1 and m = –1, 0, 1. The matrix representation of in a basis of eigenstates of is since the eigenvalues are 0 and ±ħ.

Stern-Gerlach and spin What is ? We know it must equal but what is a? We have Hence , up to an overall phase. Similarly, we can show that , hence

Stern-Gerlach and spin Similarly, Now, since , we can write Since we can write

Pauli matrices It is straightforward to check that these matrix representations have the correct commutation relations: But Pauli discovered 2 × 2 matrices with the same commutation relations: (The “Pauli matrices” are these matrices without the ħ/2 factors.) These are the operators for the components of electron spin!

Pauli matrices We can write the eigenstates of as for Sz = ħ/2 and as for Sz = –ħ/2. Since for s = ½, we refer to electron spin as “spin-½”.

Stern-Gerlach and spin More odd features of electron spin: The eigenvalues of are ±ħ/2. We can write an eigenstate of with eigenvalue mħ as but an analogous eigenstate of , namely , would not be single-valued. Yet experiments show that these electron spin eigenstates are not invariant under rotation by 2π, but they are invariant under rotation by 4π! This is reminiscent of a trick with a twisted ribbon….

Stern-Gerlach and spin This is reminiscent of a trick with a twisted ribbon…one twist cannot be undone, but two twists are equivalent to no twist.

Stern-Gerlach and spin One more odd feature of electron spin: For orbital angular momentum, we found thatμz = eLz/2me. For spin angular momentum, experiment shows that μz = eSz/me. That is, electronic spin produces an anomalous “double” magnetic moment. Therefore, the total magnetic moment of an electron with orbital angular momentum mħ and spin angular momentum ±ħ/2 is

Atomic quantum numbers (again) We associated every eigenstate of the hydrogen atom with three quantum numbers n, l and m. But now we have to introduce a fourth quantum number, the spin: ms = ±½ . The degeneracy of the energy eigenvalue En is therefore not n2 but 2n2, since there are two spin states for every set of quantum numbers n, l and m. The nucleus, too, has spin angular momentum. But its magnetic moment is relatively tiny because the mass of a proton is about 2000 times the electron mass. In this course we neglect the spin and magnetic moment of the nucleus.

Exercise: Show that the superposition of wave functions is normalized if each wave function is, and calculate and ΔLz.

Exercise: Show that the superposition of wave functions is normalized if each wave function is, and calculate and ΔLz. Solution: Since the components have different eigenvalues, they are orthonormal, and the normalization is obtained from the absolute value of the squares of the coefficients:

Exercise: Show that the superposition of wave functions is normalized if each wave function is, and calculate and ΔLz. Solution:

Exercise: What happens in a Stern-Gerlach experiment, if each electron in an incident beam of hydrogen atoms has l = 1?

Exercise: What happens in a Stern-Gerlach experiment, if each electron in an incident beam of hydrogen atoms has l = 1? Solution: The magnetic moment of the electron depends on Lz and Sz according to Since m= –1, 0, 1 and, independently, ms = ±½, we get five possible values of m+2ms : 2, 1, 0, –1, –2. We therefore expect to see 5 separate spots on the screen.

Spin-orbit coupling We discussed atomic magnetic moments in a magnetic field that is uniform or non-uniform. But even without any external magnetic field, an electron feels an effective field. Why?

Spin-orbit coupling We discussed atomic magnetic moments in a magnetic field that is uniform or non-uniform. But even without any external magnetic field, an electron feels an effective field. Why? The electron moves relative to the nucleus. Transforming the Coulomb field to the electron’s rest frame yields a magnetic field B' = –v × E/c2. Since E is radial, –v × E/c2is –dV(r)/dr times r × p/emec2r = L/emec2r. Since the electron’s magnetic moment e/me interacts with B', the spin-orbit interaction contains also . It enters the Hamiltonian as where V(r) is the Coulomb potential.

Spin-orbit coupling To compute the eigenvalues of , we must know how to add angular momenta. Defining , we find that and so on, i.e. the components of follow exactly the same algebra as the components of and . We immediately infer that the eigenvalues of are j(j+1)ħ2 and that the eigenvalues of are –jħ, (–j+1)ħ,…, (j–1)ħ,jħ.

Spin-orbit coupling To compute the eigenvalues of , we must know how to add angular momenta. Defining , we find that and so on, i.e. the components of follow exactly the same algebra as the components of and . We immediately infer that the eigenvalues of are j(j+1)ħ2 and that the eigenvalues of are –jħ, (–j+1)ħ,…, (j–1)ħ,jħ. Now from we derive

Exercise: The spin-orbit coupling splits the degeneracy between the hydrogen states ψ2,1,1, –½ and ψ2,1,1,½ by ΔE = 4.5 × 10-5 eV. Estimate the magnetic field B' felt by the electron.

Exercise: The spin-orbit coupling splits the degeneracy between the hydrogen states ψ2,1,1, –½ and ψ2,1,1,½ by ΔE = 4.5 × 10-5 eV. Estimate the magnetic field B' felt by the electron. Solution: The energy splitting is due to the interaction of the electron’s magnetic moment with the effective magnetic field B'. In the rest frame of the electron only the spin magnetic moment contributes: μzB' = (eSz/me)B' = ±eB'ħ/2me, hence ΔE = eB'ħ/me and B'= meΔE/eħ = ΔE/2μB = (4.5 × 10-5 eV) / 2 × (5.79 × 10-5 eV/T) = 0.39 T .

Physics 3 for Electrical Engineering