Quantum mechanics of nuclear magnetic resonance (NMR) spectroscopy

Nuclear magnetic resonance (NMR) spectroscopy uses the intrinsic magnetic moment that arises from the spin angular momentum of a spin-active nucleus.^[1] If the element of interest has a nuclear spin that is not zero,^[1] the nucleus may exist in different spin angular momentum states, where the energy of these states can be affected by an external magnetic field. For a spin I = ½ nucleus two energy levels may be considered: spin up and spin down, depending on how the spin aligns with the external magnetic field.^[2] It is important to remember that, in the presence of an external magnetic field, individual nuclei may have random orientations other than up and down. However, the sample's bulk magnetization, that is, the sum of the total magnetic moments will determine the strength of the NMR signal.^[3] In addition, the energy of the applied radio frequency used in NMR must be consistent with the energy difference between the spin states.^[3]

Hamiltonian (Ĥ)[edit]

The Hamiltonian operator represents the energy operator. The Spin Hamiltonian for a nuclear spin under an applied magnetic field (B₀) is,^[3]

Ĥ_{one spin} = -γB₀Î_Z

Where γ is the gyro-magnetic ratio and Î_Z is the z-component of the nuclear spin angular momentum.

The energy of the nuclear spin level is given by this Hamiltonian operator, since we know the eigenvalue for ψ. We will first determine the energy of states and subsequently convert it to frequency units since in NMR, energy expressed in frequency units is more common.

Eigenvalues of nuclear spin angular momentum[edit]

The equation of the Hamiltonian contains an angular momentum operator. So it will be easy if we find the eigenvalues of the angular momentum operator first and then substitute it into the Hamiltonian. For a spin half nucleus there are two eigenfunctions for Î_Z.^[3]

Let m = +1/2 and m = -1/2 and eigenfunctions are,

Î_Z ψ_m = mħψ_m

Eigenvalues and Hamiltonian[edit]

Applying the equation of nuclear spin angular momentum (Î_Z ψ_m) to one spin Hamiltonian (Ĥ_{one spin}) will give,^[3]

Ĥ_{one spin} ψ_m = -mħγB₀ψ_m

From this, eigenvalue is,

E_m = -mħγB₀

In frequency units,

E_m = -mγB₀/2π Hz

Introducing Larmor frequency (v₀), E_m = mv₀ Hz

Hence the Hamiltonian in frequency units, Ĥ_{one spin} = v₀Î_Z

Two spins without coupling[edit]

If there are two spin states, then we have to change the Hamiltonian in such a way that it accommodates both the spin states.^[3]

Ĥ_{two spins, no coupling} = v_0,1Î_1Z + v_0,2Î_2Z

v_0,1 is the Larmor frequency of first spin and v_0,2 is the Larmor frequency of second spin. Similarly Î_1Z is the z-component of angular momentum operator of first spin and Î_2Z is the z-component of angular momentum operator of first spin. Here in this case coupling is not considered. Here while considering the wave function we have to look into both spin states of both spin 1 and 2. The spin up state is represented by α and spin down is β. The wave functions hence will have four combinations as below. ψ_α,1 ψ_α,2 = αα ψ_α,1 ψ_β,2 = αβ ψ_β,1 ψ_α,2 = βα ψ_β,1 ψ_β,2 = ββ Applying these combinations into the two spin Hamiltonian above will give the eigenvalue which is the energy state. This is tabulated below.

Spin states	Eigenfunction	Eigenvalue (energy)
αα	ψ_α,1 ψ_α,2	+(1/2)v_0,1 + (1/2)v_0,2
αβ	ψ_α,1 ψ_β,2	+(1/2)v_0,1 - (1/2)v_0,2
βα	ψ_β,1 ψ_α,2	-(1/2)v_0,1 + (1/2)v_0,2
ββ	ψ_β,1 ψ_β,2	-(1/2)v_0,1 - (1/2)v_0,2

In general, the energy level (eigenvalue) can be written as;

E_m = m₁v_0,1 + m₂v_0,2

Eigenvalues of coupled spins[edit]

To consider coupling of spin 1 and 2 a coupling constant (J) and corresponding coupling term is introduced in the Hamiltonian:^[3]

Ĥ_{two spins} = v_0,1Î_1Z + v_0,2Î_2Z + J₁₂Î_1ZÎ_2Z

Applying the wave functions in this Hamiltonian gives the eigenvalues as tabulated below.

Number	Spin states	Eigenfunction	Eigenvalue (energy)
1	αα	ψ_α,1 ψ_α,2	+(1/2)v_0,1 + (1/2)v_0,2 + (1/4)J₁₂
2	αβ	ψ_α,1 ψ_β,2	+(1/2)v_0,1 - (1/2)v_0,2 - (1/4)J₁₂
3	βα	ψ_β,1 ψ_α,2	-(1/2)v_0,1 + (1/2)v_0,2 - (1/4)J₁₂
4	ββ	ψ_β,1 ψ_β,2	-(1/2)v_0,1 - (1/2)v_0,2 + (1/4)J₁₂

Selection rule and transitions[edit]

When two spins couple each other, the Hamiltonian operator will be,^[3]

Ĥ_{two spins} = v_0,1Î_1Z + v_0,2Î_2Z + J₁₂Î_1ZÎ_2Z

The eigenvalue,

E_m = m₁v_0,1 + m₂v_0,2 + m₁m₂ J₁₂

The selection rule for allowed transition is + or -1.^[1] Here we are considering homonuclear protons. Thus their αβ and βα states will have the same energy. The transition energy can be calculated by reducing the energy (eigenvalue) of the upper state from the lower state. The transition energy in frequency units is tabulated below.

Transitions	Spin states	Frequency
1 to 2	αα to αβ	-v_0,2 - (1/2)J₁₂
3 to 4	βα to ββ	-v_0,2 + (1/2)J₁₂
1 to 3	αα to βα	-v_0,1 - (1/2)J₁₂
2 to 4	αβ to ββ	-v_0,1 + (1/2)J₁₂

The transitions given in the above table is represented in the figure below.

References[edit]

^ ^a ^b ^c McHale, Jeanne L. (2017-07-06). Molecular Spectroscopy. CRC Press. ISBN 978-1-4665-8661-1.
^ Smart, Lesley E.; Moore, Elaine A. (2012-05-29). Solid State Chemistry: An Introduction, Fourth Edition. CRC Press. ISBN 978-1-4398-4790-9.
^ ^a ^b ^c ^d ^e ^f ^g ^h Keeler, James (2010-05-24). Understanding NMR Spectroscopy. John Wiley & Sons. ISBN 978-0-470-74608-0.

[:0-1] McHale, Jeanne L. (2017-07-06). Molecular Spectroscopy. CRC Press. ISBN 978-1-4665-8661-1.

[2] Smart, Lesley E.; Moore, Elaine A. (2012-05-29). Solid State Chemistry: An Introduction, Fourth Edition. CRC Press. ISBN 978-1-4398-4790-9.

[:1-3] ^ ^a ^b ^c ^d ^e ^f ^g ^h Keeler, James (2010-05-24). Understanding NMR Spectroscopy. John Wiley & Sons. ISBN 978-0-470-74608-0.

[1]

[2]

[3]