Abstract
The International Scientific Research Organization for Science, Engineering and Technology (ISROSET) is a Non-Profit Organization; The ISROSET is dedicated to improvement in academic sectors of Science (Chemistry, Bio-chemistry, Zoology, Botany, Biotechnology, Pharmaceutical Science, Bioscience, Bioinformatics, Biometrics, Biostatistics, Microbiology, Environmental Management, Medical Science, Forensic Science, Home Science, Library Science, Material Science Military Science, Physical Science, Physical Education Science, Educational Science, Fisheries, seed technology, Agriculture, Forestry Science, Mathematics, Physics, Statistics and Geology/Earth Science), Computer Science, Engineering and Information Technology, Commerce, Management, Economics Sociology and Social Science.
Highlights
The Voigt function is considered to be a special and important in depiction of the symmetric feature of any respond peak profile because of its theoretical importance and practically well-fit in to experimental data [1]
It is a known fact that the impedance spectroscopic plots show relaxation peaks in the radio frequency region, correspond to the different relaxing species that are present in the composition
The Voigt function (V(x)) is defined as the convolution between Lorentzian (L(x)) and Gaussian function (G(x)), expressed as: along the instrument distortion can be studied by means of Lorentzian and Gaussian functions
Summary
The Voigt function is considered to be a special and important in depiction of the symmetric feature of any respond peak profile because of its theoretical importance and practically well-fit in to experimental data [1]. Spectroscopic peaks are generally described either by Gaussian or Lorentzian fitting [2,3] The former explains about the single relaxation and the later describes multiple relaxation phenomena. It provides information about the instrument- limitation. The Voigt function (V(x)) is defined as the convolution between Lorentzian (L(x)) and Gaussian function (G(x)), expressed as: along the instrument distortion can be studied by means of Lorentzian and Gaussian functions. This type of combined analysis in the literature, especially on BLSF is very limited
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