Crystal momentum

In solid-state physics crystal momentum or quasimomentum^[1] is a momentum-like vector associated with electrons in a crystal lattice. It is defined by the associated wave vectors $k$ of this lattice, according to

${\mathbf{p}}_{crystal} \equiv \hbar {\mathbf{k}}$

(where $\hbar$ is the reduced Planck's constant). ^[2] Like regular momentum, crystal momentum frequently exhibits the property of being conserved, and is thus extraordinarily useful to physicists and materials scientists as an analytical tool.

1 Lattice symmetry origins
2 Physical significance
- 2.1 Nonzero steady velocity
- 2.2 Response to electric and magnetic fields
3 Applications
- 3.1 ARPES
4 References

Lattice symmetry origins

A common method of modeling crystal structure and behavior is to view electrons as quantum mechanical particles traveling through a fixed infinite periodic potential $V (x)$ such that

$V({\mathbf{x}}+{\mathbf{a}})=V({\mathbf{x}}),$

where $a$ is an arbitrary lattice vector. Such a model is sensible because (a) crystal ions that actually form the lattice structure are typically on the order of tens of thousands of times more massive than electrons ,^[3] making it safe to replace them with a fixed potential structure, and (b) the macroscopic dimensions of a crystal are typically far greater than a single lattice spacing, making edge effects negligible. A consequence of this potential energy function is that it is possible to shift the initial position of an electron by any lattice vector $a$ without changing any aspect of the problem, thereby defining a discrete symmetry. (Speaking more technically, an infinite periodic potential implies that the lattice translation operator $T (a)$ commutes with the Hamiltonian, assuming a simple kinetic-plus-potential form.) ^[4]

These conditions imply Bloch's theorem, which states in terms of equations that

$\psi_n({\mathbf{x}})=e^{i{\mathbf{k} {\mathbf{\cdot x}}}}u_{n{\mathbf{k}}}({\mathbf{x}}), \qquad u_{n{\mathbf{k}}}({\mathbf{x}}+{\mathbf{a}})=u_{n{\mathbf{k}}}({\mathbf{x}})$ ,

or in terms of words that an electron in a lattice, which can be modeled as a single particle wave function $ψ(x)$ , finds its stationary state solutions in the form of a plane wave multiplied by a periodic function $u (x)$ . The theorem arises as a direct consequence of the aforementioned fact that the lattice symmetry translation operator commutes with the system's Hamiltonian. ^[5] ^[6]

One of the notable aspects of Bloch's theorem is that it shows directly that steady state solutions may be identified with a wave vector $k$ , meaning that this quantum number remains a constant of motion. Crystal momentum is then conventionally defined by multiplying this wave vector by Planck's constant:

${\mathbf{p}}_{crystal} = \hbar {\mathbf{k}}.$

While this is in fact identical to the definition one might give for regular momentum (for example, by treating the effects of the translation operator by the effects of a particle in free space ^[7]), there are important theoretical differences. For example, while regular momentum is completely conserved, crystal momentum is only conserved to within a lattice vector, i.e., an electron can be described not only by the wave vector $k$ , but also with any other wave vector k' such that

k' = k + K,

where $K$ is an arbitrary reciprocal lattice vector. ^[8] This is a consequence of the fact that the lattice symmetry is discrete as opposed to continuous, and thus its associated conservation law cannot be derived using Noether's theorem.

Physical significance

The phase modulation of the Bloch state $\psi_n({\mathbf{x}})=e^{i{\mathbf{k} {\mathbf{\cdot x}}}}u_{n{\mathbf{k}}}({\mathbf{x}})$ is the same as that of a free particle with momentum $\hbar k$ , i.e. $k$ gives the state's periodicity, which is not the same as that of the lattice. This modulation contributes to the kinetic energy of the particle (whereas the modulation is entirely responsible for the kinetic energy of a free particle).

In regions where the band is approximately parabolic the crystal momentum is equal to the momentum of a free particle with momentum $\hbar k$ if we assign the particle an effective mass that's related to the curvature of the parabola.

Nonzero steady velocity

Crystal momentum corresponds to the physically measurable concept of velocity according to ^[9]

${\mathbf{v}}_n({\mathbf{k}}) = \frac{1}{\hbar} \nabla_{\mathbf{k}} E_n({\mathbf{k}}).$

This is the same formula as the group velocity of a wave. Because this has nonzero velocity solutions, it implies that any crystal structure containing electrons should be a perfect conductor. ^[10] In an infinite perfect crystal, an electron can travel forever in the same direction, without ever colliding with the atoms in the crystal. In practice, however, crystals conductivity is finite because crystals are not perfect. Electrons can collide with and scatter from anything that alters the perfect periodic structure of the crystal, most commonly, crystallographic defects, the crystal surface, and random thermal vibrations of the atoms in the crystal (phonons). ^[11]

Nevertheless, if one looks sufficiently deeply within the crystal on a short enough distance scale, these solutions form a valid approximation and one really can visualize Bloch electrons as crystal momentum eigenstates passing through a crystal at finite nonzero velocity.

Response to electric and magnetic fields

Crystal momentum also plays a seminal role in the Semiclassical model of electron dynamics, where it obeys the equations of motion (in cgs units) ^[8]

${\mathbf{v}}_n({\mathbf{k}}) = \frac{1}{\hbar} \nabla_{\mathbf{k}} E_n({\mathbf{k}}),$

${\mathbf{\dot{p}}}_{crystal} = -e \left( {\mathbf{E}} -\frac{1}{c} {\mathbf{v}} \times {\mathbf{H}} \right)$

Here perhaps the analogy between crystal momentum and true momentum is at its most powerful, for these are precisely the equations that a free space electron obeys in the absence of any crystal structure. Crystal momentum also earns its chance to shine in these types of calculations, for, in order to calculate an electron's trajectory of motion using the above equations one need only consider external fields, while attempting the calculation from a set of EOMs based on true momentum would require taking into account individual coulomb and Lorenz forces of every single lattice ion in addition to the external field.

Applications

ARPES

In angle resolved photo-emission spectroscopy (ARPES), irradiating light on a crystal sample results in the ejection of an electron away from the crystal. Throughout the course of the interaction, one is allowed to conflate the two concepts of crystal and true momentum and thereby gain direct knowledge of a crystal's band structure. That is to say, an electron's crystal momentum inside the crystal becomes its true momentum after it leaves, and the true momentum may be subsequently inferred from the equation

${\mathbf{p_{\parallel}}} = \sqrt{2 m E_{kin}}\sin \theta$

by measuring the angle and kinetic energy at which the electron exits the crystal ( $m$ is a single electron's mass). Interestingly, because crystal symmetry in the direction normal to the crystal surface is lost at the crystal boundary, crystal momentum in this direction is not conserved. Consequently, the only directions in which useful ARPES data can be gleaned are directions parallel to the crystal surface. ^[12]

References

^ Gurevich V.L.; Thellung A. (October 1990). "Quasimomentum in the theory of elasticity and its conversion". Physical Review B 42 (12): 7345–7349. Bibcode 1990PhRvB..42.7345G. doi:10.1103/PhysRevB.42.7345.
^ Neil W. Ashcroft; N. David Mermin (1976). Solid State Physics. Brooks/Cole Thomson Learning. p. 139. ISBN 0-03-083993-9.
^ Peter J. Mohr; Barry N. Taylor (2004]). "The 2002 CODATA Recommended Values of the Fundamental Physical Constants". http://physics.nist.gov/cuu/constants.
^ Neil W. Ashcroft; N. David Mermin (1976). Solid State Physics. Brooks/Cole Thomson Learning. p. 134. ISBN 0-03-083993-9.
^ J. J. Sakurai (1994). Modern Quantum Mechanics. Addison-Wesley. p. 139. ISBN 0-201-53929-2.
^ Neil W. Ashcroft; N. David Mermin (1976). Solid State Physics. Brooks/Cole Thomson Learning. pp. 261–266. ISBN 0-03-083993-9.
^ Robert Littlejohn (2007). "Physics 221a class notes 4: Spatial Degrees of Freedom". http://bohr.physics.berkeley.edu/classes/221/0708/221.html.
^ ^a ^b Neil W. Ashcroft; N. David Mermin (1976). Solid State Physics. Brooks/Cole Thomson Learning. p. 218. ISBN 0-03-083993-9.
^ Neil W. Ashcroft; N. David Mermin (1976). Solid State Physics. Brooks/Cole Thomson Learning. p. 141. ISBN 0-03-083993-9.
^ Neil W. Ashcroft; N. David Mermin (1976). Solid State Physics. Brooks/Cole Thomson Learning. p. 215. ISBN 0-03-083993-9.
^ Neil W. Ashcroft; N. David Mermin (1976). Solid State Physics. Brooks/Cole Thomson Learning. p. 216. ISBN 0-03-083993-9.
^ Damascelli, Andrea; Zahid Hussain and Zhi-Xun Shen (2003). "Angle-resolved photoemission studies of the cuprate superconductors". Reviews of Modern Physics 75 (2): 473. arXiv:cond-mat/0208504. Bibcode 2003RvMP...75..473D. doi:10.1103/RevModPhys.75.473.

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Electronic band structures

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Crystal momentum

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Lattice symmetry origins