J. Kauppinen scite author profile

The general theory of Fourier self-deconvolution, i.e., spectral deconvolution using Fourier transforms and the intrinsic lineshape, is developed. The method provides a way of computationally resolving overlapped lines that can not be instrumentally resolved due to their intrinsic linewidth. Examples of the application of the technique to synthetic and experimental infrared spectra are presented, and potential applications are discussed. It is shown that lines in spectra having moderate signal/noise ratios (∼1000) can readily be reduced in width by a factor of 3. The method is applicable to a variety of spectroscopic techniques.

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Fourier transforms in the computation of self-deconvoluted and first-order derivative spectra of overlapped band contours

Kauppinen¹,

Moffatt²,

Mantsch³

et al. 1981

Anal. Chem.

348

136

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Precision in Condensed Phase Vibrational Spectroscopy

et al. 1982

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Noise in Fourier self-deconvolution

et al. 1981

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A general formula for computing changes in the signal-to-noise ratio of a spectrum resulting from the Fourier self-deconvolution procedure is derived. Self-deconvolution reduces the intrinsic halfwidths of lines by a factor K, which is in practice limited by the noise in the spectrum. With the help of the derived formula, the rate of decrease in the SNR as a function of K for eight different smoothing (apodization) functions is studied. With high K values there are significant differences in the SNR as a result of the use of different smoothing functions. With K = 4 a difference of more than 1 order of magnitude between two extreme cases is demonstrated, and with K = 5 a difference of almost 2 orders of magnitude in the SNR is predicted.

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Fourier Transforms in Spectroscopy

Kauppinen¹,

Partanen²

2001

106

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J. Kauppinen

Fourier Self-Deconvolution: A Method for Resolving Intrinsically Overlapped Bands

Fourier transforms in the computation of self-deconvoluted and first-order derivative spectra of overlapped band contours

Precision in Condensed Phase Vibrational Spectroscopy

Noise in Fourier self-deconvolution

Fourier Transforms in Spectroscopy

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