McCumber relation

The McCumber relation (or McCumber theory) refers to the effective cross-sections of absorption and emission of light in the physics of solid-state lasers .

Definition
Let $$\sigma_{\rm a}(\omega)$$ be the effective absorption cross-section $$\sigma_{\rm e}(\omega)$$ be effective emission cross-sections at frequency $$\omega$$, and let $$~T~$$ be the effective temperature of the medium. The McCumbner relation is


 * (1) $$~ ~ ~\frac{\sigma_{\rm e}(\omega)}{\sigma_{\rm a}(\omega)}\exp\!\left( \frac{\hbar \omega}{k_{\rm B} T}\right)

=\left(\frac{N_1}{N_2}\right)_T =\exp\!\left( \frac{\hbar \omega_{\rm z}}{k_{\rm B} T}\right)$$ where $$ \left(\frac{N_1}{N_2}\right)_T$$ is thermal steady-state ratio of populations; frequency $$\omega_{\rm z}$$ is called "zero-line" frequency $$\hbar $$ is the Planck constant and $$k_{\rm B} $$ is the Boltzmann constant. Note that the right-hand side of Equation (1) does not depend on $$~\omega~$$.

Gain
It is typical that the lasing properties of a medium are determined by the temperature and the population at the excited laser level, and are not sensitive to the method of excitation used to achieve it. In this case, the absorption cross-section $$\sigma_{\rm a}(\omega)$$ and the emission cross-section $$\sigma_{\rm e}(\omega)$$ at frequency $$~\omega~$$ can be related to the lasers gain in such a way, that the gain at this frequency can be determined as follows:
 * (2) $$~ ~ ~ G(\omega)=N_2 \sigma_{\rm e}(\omega)-N_1 \sigma_{\rm a}(\omega)$$

D.E.McCumber had postulated these properties and found that the emisison and absorption cross-sections are not independent ; they are related with Equation (1).

Idealized atoms
In the case of an idealized two-level atom the detailed balance for the emission and absorption which preserves the Max Planck formula for the black body radiation leads to equality of cross-section of absorption and emission. In the solid-state lasers the splitting of each of laser levels leads to the broadening which greatly exceeds the natural spectral linewidth. In the case of an ideal two-level atom, the product of the linewidth and the lifetime is of order of unity, which obeys the Heisenberg uncertainty principle. In solid-state laser materials, the linewidth is several orders of magnitude larger so the spectra of emission and absorption are determined by distribution of excitation among sublevels rather than by the shape of the spectral line of each individual transition between sublevels. This distribution is determined by the effective temperature within each of laser levels. The McCumber hypothesis is that the distribution of excitation among sublevels is thermal. The effective temperature determines the spectra of emission and absorption ( The effective temperature is called a temperature by scientists even if the excited medium as whole is pretty far from the thermal state )

Deduction of the McCumber relation
Consider the set of active centers (fig.1.). Assume fast transition between sublevels within each level, and slow transition between levels. According to the McCumber hypothesis, the cross-sections $$\sigma_{\rm a}$$ and $$\sigma_{\rm e}$$ do not depend on the populations $$N_1$$ and $$N_2$$. Therefore, we can deduce the relation, assuming the thermal state.

Let $$~v(\omega)~$$ be group velocity of light in the medium, the product $$~n_2\sigma_{\rm e}(\omega) v(\omega)D(\omega)~$$ is spectral rate of stimulated emission, and $$~n_1\sigma_{\rm a}(\omega) v(\omega)D(\omega)~$$ is that of absorption; $$a(\omega)n_2$$ is spectral rate of spontaneous emission. (Note that in this approximation, there is no such thing as a spontaneous absorption) The balance of photons gives:
 * (3) $$~ ~ ~

n_2\sigma_{\rm e}(\omega) v(\omega)D(\omega)+n_2 a(\omega)= n_1\sigma_{\rm a}(\omega) v(\omega)D(\omega) $$

Which can be rewritten as


 * (4) $$~ ~ ~

D(\omega)= \frac{\frac{a(\omega)}{\sigma_{\rm e}(\omega) v(\omega)}} {\frac{n_1}{n_2} \frac{\sigma_{\rm a}(\omega)}{\sigma_{\rm e}(\omega)}-1} $$

The thermal distribution of density of photons follows from the laws of the blackbody radiation


 * (5) $$~ ~ ~

D(\omega)~=~ \frac{\frac{1}{\pi^2} \frac{\omega^2}{c^3}} {\exp\!\left(\frac{\hbar\omega}{k_{\rm B}T}\right)-1} $$

Both (4) and (5) hold for all frequencies $$~\omega~$$. For the case of idealized two-level active centers, $$~\sigma_{\rm a}(\omega)=\sigma_{\rm e}(\omega)~$$, and $$~n_1/n_2=\exp\!\left( \frac{\hbar\omega}{k_{\rm B}T} \right)$$, which leads to the relation between the spectral rate of spontaneous emission $$a(\omega)$$ and the emission cross-section $$~\sigma_{\rm e}(\omega)~$$ . (We keep the term probability of emission for the quantity $$~a(\omega){\rm d}\omega{\rm d}t~$$, which is probability of emission of a photon within small spectral interval $$~(\omega,\omega+{\rm d}\omega)~$$ during a short time interval $$~(t,t+{\rm d}t)~$$, assuming that at time $$~t~$$ the atom is excited.) The relation (D2) is a fundamental property of spontaneous and stimulated emission, and perhaps the only way to prohibit a spontaneous break of the thermal equilibrium in the thermal state of excitations and photons.

For each site number $$~s~$$, for each sublevel number $$j$$, the partial spectral emission probability $$~a_{s,j}(\omega)~$$ can be expressed from consideration of idealized two-level atoms
 * (6) $$~ ~ ~
 * (6) $$~ ~ ~

a_{s,j}(\omega)=\sigma_{s,j}(\omega) \frac{\omega^2 v(\omega)}{\pi^2c^3}. $$

Neglecting the cooperative coherent effects, the emission is additive: for any concentration $$~q_{s}~$$ of sites and for any partial population $$~n_{s,j}~$$ of sublevels, the same proportionality between $$~a~$$ and $$~\sigma_{\rm e}~$$ holds for the effective cross-sections:
 * (7) $$ ~ ~ ~

\frac{a(\omega)}{\sigma_{\rm e}(\omega)}= \frac{\omega^2 v(\omega)}{\pi^2c^3} $$

Then, the comparison of (D1) and (D2) gives the relation


 * (8) $$~ ~ ~

\frac{n_1}{n_2} \frac{\sigma_{\rm a}(\omega)} {\sigma_{\rm e}(\omega)}= \exp\!\left( \frac{\hbar\omega}{k_{\rm B}T}\right). $$

This relation is equivalent of the McCumber relation (mc), if we define the zero-line frequency $$\omega_{Z}$$ as solution of equation


 * (9) $$~ ~ \left(\frac{n_2}{n_1}\right)_{\!T}=

\exp\!\left(\frac{\hbar \omega_{\rm Z}}{k_{\rm B}T}\right) $$

The subscript $$~T~$$ indicates that the ratio of populations in evaluated in the thermal state. The zero-line frequency can be expressed as
 * (10) $$ ~ ~ ~ \omega_{\rm Z}=\frac{k_{\rm B}T}{\hbar}

\ln \left(\frac{n_1}{n_2}\right)_{T} $$ Then (n1n2) becomes equivalent of the McCumber relation (mc).

No specific property of sublevels of active medium is required to keep the McCumber relation. It follows from the assumption about quick transfer of energy among excited laser levels and among lower laser levels. The McCumber relation (mc) has the same range of validity as the concept of the emission cross-section itself.

Confirmation of the McCumber relation
The McCumber relation is confirmed for various media. In particular relation (1) makes it possible to approximate two functions of frequency, emission and absorption cross sections, with single fit .

Violation of McCumber leads to perpetual motion


In 2006 the strong violation of McCumber relation was "observed" for Yb:Gd2SiO5 and reported in 3 independent journals. Typical dependence of the effective cross-sections on $$ \lambda=\frac{2\pi c}{\omega}$$ reported is shown in FIg.2 with thick curves. The emission cross-section is practically zero at wavelength 975nm; this property makes Yb:Gd2SiO5 an excellent material for efficient solid-state lasers.

However, the property reported (thick curves) is not compatible with the Second Law of thermodynamics. With such a material, the Perpetual motion device would be possible. It would be sufficient to fill a box with reflecting walls with Yb:Gd2SiO5 and allow it to exchange radiation with a blackbody through a spectrally-selective window which is transparent in vicinity of 975nm and reflective at other wavelengths. Due to the lack of emissivity at 975nm the medium should warm, breaking the thermal equilibrium.

On the base of the McCumber relation, the experimental results

were corrected , see figure at right; then this correction had been confirmed experimentally.

Conclusions
The McCumber relation (1) seems to be the only way to prohibit the perpetual motion of Second kind in the two–level approximation. Any deviation of the cross-sections from the McCumber relation leads to the violation of the Second Law of thermodynamics. In this sense, the range of validity of the MacCumber relation is the same, as the range of validity of concept of existence of the effective cross-sections.