Clausen function

In mathematics, the family of Debye functions is defined by

${\displaystyle D_n(x)=\frac{n}{x^n}{\displaystyle \underset{0}{\overset{x}{\int }}}\frac{t^n}{e^t-1}dt.}$

The functions are named in honor of Peter Debye, who came across this function (with n = 3) in 1912 when he analytically computed the heat capacity of what is now called the Debye model.

Mathematical properties

Relation to other functions

The Debye functions are closely related to the Polylogarithm.

Limiting values

For ${\displaystyle x\to 0}$ :

${\displaystyle D_n(0)=1.}$

For ${\displaystyle x>>1}$ : ${\displaystyle D_n}$ is given by the Gamma function and the Riemann zeta function:

${\displaystyle D_n(x)\propto {\displaystyle \underset{0}{\overset{\mathrm{\infty }}{\int }}}\mathrm{d}t\frac{t^n}{\exp (t)-1}=\mathrm{\Gamma }(n+1)\zeta (n+1).[\mathrm{\Re }n>0]}$ ^[1]

Applications in solid-state physics

The Debye model

The Debye model has a density of vibrational states

${\displaystyle g_{\mathrm{D}}(\omega )=\frac{9{\omega }^2}{{\omega }_{\mathrm{D}}^3}}$ for ${\displaystyle 0\le \omega \le {\omega }_{\mathrm{D}}}$

with the Debye frequency ω_D.

Internal energy and heat capacity

Inserting g into the internal energy

${\displaystyle U={\displaystyle \underset{0}{\overset{\mathrm{\infty }}{\int }}}\mathrm{d}\omega g(\omega )\hslash \omega n(\omega )}$

with the Bose-Einstein distribution

${\displaystyle n(\omega )=\frac{1}{\exp (\hslash \omega /k_{\mathrm{B}}T)-1}}$.

one obtains

${\displaystyle U=3k_{\mathrm{B}}T{D}_3(\hslash {\omega }_{\mathrm{D}}/k_{\mathrm{B}}T)}$.

The heat capacity is the derivative thereof.

Mean squared displacement

The intensity of X-ray diffraction or neutron diffraction at wavenumber q is given by the Debye-Waller factor or the Lamb-Mössbauer factor. For isotropic systems it takes the form

${\displaystyle \exp (-2W(q))=\exp (-q^2⟨u_x^2⟩}$).

In this expression, the mean squared displacement refers to just once Cartesian component u_x of the vector u that describes the displacement of atoms from their equilibrium positions. Assuming harmonicity and developing into normal modes,^[2] one obtains

${\displaystyle 2W(q)=\frac{{\hslash }^2{q}^2}{6M{k}_{\mathrm{B}}T}{\displaystyle \underset{0}{\overset{\mathrm{\infty }}{\int }}}\mathrm{d}\omega \frac{k_{\mathrm{B}}T}{\hslash \omega }g(\omega )\coth \frac{\hslash \omega }{2k_{\mathrm{B}}T}=\frac{{\hslash }^2{q}^2}{6M{k}_{\mathrm{B}}T}{\displaystyle \underset{0}{\overset{\mathrm{\infty }}{\int }}}\mathrm{d}\omega \frac{k_{\mathrm{B}}T}{\hslash \omega }g(\omega )[\frac{2}{\exp (\hslash \omega /k_{\mathrm{B}}T)-1}+1].}$

Inserting the density of states from the Debye model, one obtains

${\displaystyle 2W(q)=\frac{3}{2}\frac{{\hslash }^2{q}^2}{M\hslash {\omega }_{\mathrm{D}}}[2\left(\frac{k_{\mathrm{B}}T}{\hslash {\omega }_{\mathrm{D}}}\right)D_1\left(\frac{\hslash {\omega }_{\mathrm{D}}}{k_{\mathrm{B}}T}\right)+\frac{1}{2}]}$.

References

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Further reading

• Template:AS ref
• "Debye function" entry in MathWorld, defines the Debye functions without prefactor n/xⁿ

Implementations

• Fortran 77 code by Allan MacLeod from Transactions on Mathematical Software
• Fortran 90 version
• C version of the GNU Scientific Library