We develop an approximation method for the differential entropy $h(\mathbf{X})$ of a $q$-component Gaussian mixture in $\mathbb{R}^n$. We provide two examples of approximations using our method denoted by $\bar{h}^{\mathrm{Taylor}}_{C,m}(\mathbf{X})$ and $\bar{h}^{\mathrm{Polyfit}}_{C,m}(\mathbf{X})$. We show that $\bar{h}^{\mathrm{Taylor}}_{C,m}(\mathbf{X})$ provides an easy to compute lower bound to $h(\mathbf{X})$, while $\bar{h}^{\mathrm{Polyfit}}_{C,m}(\mathbf{X})$ provides an accurate and efficient approximation to $h(\mathbf{X})$. $\bar{h}^{\mathrm{Polyfit}}_{C,m}(\mathbf{X})$ is more accurate than known bounds, and conjectured to be much more resilient than the approximation of [5] in high dimensions.

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