Loop theorem

Bandwidth expansion is a technique for widening the bandwidth or the resonances in an LPC filter. This is done by moving all the poles towards the origin by a constant factor ${\displaystyle \gamma }$. The bandwidth-expanded filter ${\displaystyle A^{\prime }(z)}$ can be easily derived from the original filter ${\displaystyle A(z)}$ by:

${\displaystyle A^{\prime }(z)=A(z/\gamma )}$

Let ${\displaystyle A(z)}$ be expressed as:

${\displaystyle A(z)={\displaystyle \sum _{k=0}^N}{a}_k{z}^{-k}}$

The bandwidth-expanded filter can be expressed as:

${\displaystyle A^{\prime }(z)={\displaystyle \sum _{k=0}^N}{a}_k{\gamma }^k{z}^{-k}}$

In other words, each coefficient ${\displaystyle a_k}$ in the original filter is simply multiplied by ${\displaystyle {\gamma }^k}$ in the bandwidth-expanded filter. The simplicity of this transformation makes it attractive, especially in CELP coding of speech, where it is often used for the perceptual noise weighting and/or to stabilize the LPC analysis. However, when it comes to stabilizing the LPC analysis, lag windowing is often preferred to bandwidth expansion.

References

P. Kabal, "Ill-Conditioning and Bandwidth Expansion in Linear Prediction of Speech", Proc. IEEE Int. Conf. Acoustics, Speech, Signal Processing, pp. I-824-I-827, 2003.