## 17 November 2013

### The Kramers-Kronig relations - part 1

[See part 2 for some technical aspects]
Very nice derivation of the Kramers-Kronig relations (on Wikipedia, of all places), exploiting the relation between the even and odd components of a function $$\chi (t)$$ and the real and imaginary parts of its Fourier transform $$\chi (\omega) = \chi ' (\omega) + i \, \chi '' (\omega)$$.

One usually invokes the analyticity of $$\chi (\omega)$$ in the upper half-plane, which must first be derived from the causality: $$\chi (t) = 0$$ for $$t < 0$$. Complex integration along a well-chosen contour then yields the Kramers-Kronig relations in their standard form [1]:
\begin{align}
\label{eq:KK}
\chi (\omega) &= \frac{1}{i \, \pi} \mathcal{P} \int_{-\infty}^{\infty} \text{d} \omega ' \frac{\chi (\omega ')}{\omega ' - \omega} \quad \text{or, for the components:} \nonumber \\
\chi '(\omega) &= \frac{1}{\pi} \mathcal{P} \int_{-\infty}^{\infty} \text{d} \omega ' \frac{\chi ''(\omega ')}{\omega ' - \omega} \\
\chi ''(\omega) &= -\frac{1}{\pi} \mathcal{P} \int_{-\infty}^{\infty} \text{d} \omega ' \frac{\chi '(\omega ')}{\omega ' - \omega} \nonumber
\end{align}
where $$\mathcal{P}$$ denotes Cauchy's principal value.
However, this requires two trips to the complex plane and the result is not very intuitive. It is better to split the reasoning into two steps: write the relation in the time domain and then go to the frequency domain by using general (and hopefully, already known) properties of the Fourier transform [2]. This can help separate the conceptual novelty from the technical difficulty.

 Illustration of the Kramers-Kronig relations between a physical (i. e. causal and real) signal and its Fourier transform. Work by FDominec, released under a Creative Commons Attribution-Share Alike 3.0 Unported license.
The first step is writing the response function as the sum of its even and odd components:
\begin{align}
\chi (t) &=  \chi _{e}(t) + \chi _{o}(t) \quad \text{where:} \nonumber\\
\chi _{e}(t) &=  \frac{1}{2} (\chi (t) + \chi (-t)) \quad \text{and}\\
\chi _{o}(t) &=  \frac{1}{2} (\chi (t) - \chi (-t)) \nonumber
\end{align}
something we can do for any real function. The causality relation ($$\chi (t) = 0$$ for $$t < 0$$) implies that:
\begin{align}
\label{eq:parity}
\chi _{e}(t) &= \operatorname{sgn}(t) \, \chi _{o}(t) \quad \text{and}\\
\chi _{o}(t) &= \operatorname{sgn}(t) \, \chi _{e}(t) \nonumber
\end{align}
where $$\operatorname{sgn}(t)$$ gives the sign of its argument (-1 for negative and +1 for positive values.)

This is interesting because the real and imaginary parts of the Fourier transform $$\mathcal{F}$$ are given by the even and odd components of the function, respectively:
\begin{align}
\label{eq:Fourier}
\chi (\omega) &= \chi ' (\omega) + i \, \chi '' (\omega) = \mathcal{F} [\chi (t) ] \nonumber\\
\chi ' (\omega) &= \mathcal{F} [\chi _{e} (t) ] \\
i \, \chi '' (\omega) &= \mathcal{F} [\chi _{o} (t) ] \nonumber
\end{align}
The first step is over; to obtain \eqref{eq:KK} we must now combine \eqref{eq:parity} with \eqref{eq:Fourier} and go to the frequency domain. We need to remember that the Fourier transform of a product is the convolution of the Fourier transforms of the factors and we also need an expression for the Fourier transform of the $$\operatorname{sgn}(t)$$ function. We will do this in part 2.

[1] P. M. Chaikin and T. C. Lubensky, Principles of condensed matter physics, Cambridge University Press (2000). Chapter 7.
[2] For a recent and readily available reference, see: C. Warwick, Understanding the Kramers-Kronig Relation Using A Pictorial Proof. The idea goes at least as far back as the (very terse) presentation of B. Y.-K. Hu, Kramers-Kronig in two lines, Am. J. Phys. 57, 821, (1989).  ↩

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