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q-Gaussian Tsallis Line Shapes and Raman Spectral Bands

Amelia Carolina Sparavigna

2023International Journal of Sciences38 citationsDOIOpen Access PDF

Abstract

q-Gaussians are probability distributions having their origin in the framework of Tsallis statistics. A continuous real parameter q is characterizing them so that, in the range 1 < q < 3, the q-functions pass from the usual Gaussian form, for q close to 1, to that of a heavy tailed distribution, at q close to 3. The value q=2 corresponds to the Cauchy-Lorentzian distribution. This behavior of q-Gaussian functions could be interesting for a specific application, that regarding the analysis of Raman spectra, where Lorentzian and Gaussian profiles are the line shapes most used to fit the spectral bands. Therefore, we will propose q-Gaussians with the aim of comparing the resulting fit analysis with data available in literature. As it will be clear from the discussion, this is a very sensitive issue. We will also provide a detailed discussion about Voigt and pseudo-Voigt functions and their role in the line shape modeling of Raman bands. We will show a successfully comparison of these functions with q-Gaussians. The role of q-Gaussians in EPR spectroscopy (Howarth et al., 2003), where the q-Gaussian is given as the

Topics & Concepts

GaussianCauchy distributionSpectral line shapeVoigt profileStatistical physicsRaman spectroscopyRange (aeronautics)Line (geometry)PhysicsProbability distributionSpectral lineGaussian processDistribution (mathematics)Tsallis statisticsGaussian functionMathematicsMathematical analysisStatisticsQuantum mechanicsMaterials scienceGeometryComposite materialAdvanced Statistical Methods and ModelsLiver Disease Diagnosis and TreatmentStatistical Mechanics and Entropy
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