Essential Concepts in MRI. Yang Xia

Essential Concepts in MRI

can describe the nuclear spins where the Hamiltonian contains the spin angular momentum operator. In NMR, the stable states of quantum mechanics systems are the eigenfunctions of H. Hence, to calculate NMR spectra we must find the eigenvalues of H.

In Chapter 2, the classical description of NMR, spin angular momentum is visualized as a spinning sphere that carries a charge (Figure 2.3b). In a quantum mechanical description of NMR, spin angular momentum is a quantum mechanical quantity without a classical analog; spin angular momentum is determined by the internal nuclear structure of the spin system. A classical limit is only approached in the case of orbital angular momentum and in the limit of large quantum numbers. Appendix 2 has some background introduction in quantum mechanics. This chapter presents the quantum mechanical description of the fundamental NMR concepts.

3.1 NUCLEAR MAGNETISM

A nuclear spin in quantum mechanical description is represented by a spin angular momentum operator I, which can be written in the usual Cartesian coordinate system as a dimensionless quantity

upper I equals upper I Subscript x Baseline i plus upper I Subscript y Baseline j plus upper I Subscript z Baseline k comma (3.1)

where Ix, Iy, and Iz are the spin operators representing the x, y, z components of the spin operator I.

The magnetic moment µ is proportional to its spin angular momentum,

micro-sign equals gamma italic h over two pi upper I comma (3.2)

where γ is a proportionality constant (called the gyromagnetic ratio), different for different nuclear species. This equation is identical to that in the classical description [Eq. (2.1)], except the spin I is now an operator.

A single nucleus in an external magnetic field (B₀ = B₀k) experiences the nuclear Zeeman interaction¹ with the field. The evolution of a spin system ψ is governed by the time-dependent Schrödinger equation,

i italic h over two pi StartFraction partial-differential Over partial-differential t EndFraction Math bar pipe bar symblom psi left-parenthesis t right-parenthesis greater-than equals script upper H Math bar pipe bar symblom psi left-parenthesis t right-parenthesis greater-than comma (3.3)

where ℋ is a Hamiltonian. (This equation plays a similar role as Eq. (2.3) in classical treatment of NMR in Chapter 2, where the Newton’s second law was used.) If ℋ is considered time-independent, the evolution of the spin system can be derived from the above equation as

Math bar pipe bar symblom psi left-parenthesis t right-parenthesis greater-than equals upper U left-parenthesis t right-parenthesis Math bar pipe bar symblom psi left-parenthesis t 0 right-parenthesis greater-than comma (3.4)

where U(t) is the evolution operator. This equation effectively separates the time-independent part |ψ(t₀)> from the time-dependent part U(t).

Since the Hamiltonian operator for the case of B₀ = B₀k is given by the Zeeman Hamiltonian, we can write down the operator ℋ as

script upper H equals en-dash micro-sign dot upper B 0 equals en-dash gamma italic h over two pi upper I dot upper B 0 equals en-dash gamma upper B 0 italic h over two pi upper I Subscript z Baseline period (3.5)

Note that only the Iz component is present in the last part of Eq. (3.5), which is due to the properties of the dot product (cf. Appendix A1.1) since B₀ = B₀k.

As in the classical description where I is the spin angular momentum (a vector) and the half-integer or integer values of I are called spin quantum number I, the spin operator Iz has m possible values (the eigenvalues), ranging from −I, −I + 1, …, I, where m is the azimuthal quantum number.

Therefore, the evolution operator U(t) can be written as

upper U left-parenthesis t right-parenthesis equals exp left-parenthesis minus StartFraction i Over italic h over two pi EndFraction script upper H t right-parenthesis equals exp left-parenthesis minus i theta upper I Subscript z Baseline right-parenthesis (3.6)

where the second step considers the fact that ω₀ = γB₀ and θ = ω₀t. U(t) is hence just a rotation operator [recall that exp^(iθ) = cosθ + i sinθ, also in Appendix A1.1], which corresponds to a rotation of the spin state |ψ> about the z axis with an angular frequency ω₀, known as the Larmor precession frequency:

omega 0 equals gamma upper B 0 period (3.7)

This equation is identical to the equation that we have derived in the classical description [Eq. (2.5)].

3.2 ENERGY DIFFERENCE

From the energy eigenvalue equation,

script upper H Math bar pipe bar symblom psi right pointing angle equals upper E left-parenthesis m right-parenthesis Math bar pipe bar symblom psi right pointing angle comma (3.8)

one can obtain the energy eigenvalues of the Zeeman Hamiltonian ℋ, which are the energy levels (called the Zeeman levels):

upper E left-parenthesis m right-parenthesis equals minus m italic h over two pi gamma upper B 0 period (3.9)

Therefore, the energy difference ΔE between any two adjacent eigenstates of a spin system, known as the Zeeman splitting, is

Math bar pipe bar symblom upper Delta upper E Math bar pipe bar symblom equals italic h over two pi gamma upper B 0 equals italic h over two pi omega 0 period (3.10)

As indicated in Eq. (3.9), a spin-1/2 system (I = 1/2) has only two eigenstates, corresponding to m = +1/2 (spin-up) and m = –1/2 (spin-down) states. Its two energy levels are therefore given by

upper E left-parenthesis plus 1 slash 2 right-parenthesis equals minus left-parenthesis 1 slash 2 right-parenthesis italic h over two pi gamma upper B 0 comma (3.11a)

upper E left-parenthesis minus 1 slash 2 right-parenthesis equals plus left-parenthesis 1 slash 2 right-parenthesis italic h over two pi gamma upper B 0 period (3.11b)

Schematically, these two energy levels, which were shown once before briefly in Figure 2.2a, are now shown more completely in Figure 3.1. Note that for the spin-1/2 system, the “spin-up”

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