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

\gamma

. The bandwidth-expanded filter

A'(z)

can be easily derived from the original filter

A(z)

by: :

A'(z) = A(z/\gamma)

Let

A(z)

be expressed as: :

A(z) = \sum_^a_kz^

The bandwidth-expanded filter can be expressed as: :

A'(z) = \sum_^a_k\gamma^kz^{-k}

In other words, each

coefficient In mathematics, a coefficient is a multiplicative factor in some term of a polynomial, a series, or an expression; it is usually a number, but may be any expression (including variables such as , and ). When the coefficients are themselves ...

a_k

in the original filter is simply multiplied by

\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 The process of weighting involves emphasizing the contribution of particular aspects of a phenomenon (or of a set of data) over others to an outcome or result; thereby highlighting those aspects in comparison to others in the analysis. That i ...

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. Signal processing