Representation and evaluation of the Arrhenius and general temperature integrals by special functions

•The general temperature integral can be expressed by several special functions.•The special function models are more accurate than the numerical integration methods.•New rational approximations can be obtained by expansion of the special functions.•New iterative isoconversional method with very hig...

Full description

Saved in:
Bibliographic Details
Published in:Thermochimica acta Vol. 705; p. 179034
Main Author: Aghili, Alireza
Format: Journal Article
Language:English
Published: Elsevier B.V 01.11.2021
Subjects:
activation energy
arithmetics
Arrhenius integral
equations
General temperature integral
Special functions
temperature
Thermal analysis
Arrhenius integral
Thermal analysis
General temperature integral
Special functions
ISSN:0040-6031, 1872-762X
Online Access:Get full text
Tags: Add Tag
No Tags, Be the first to tag this record!
Description
Summary:•The general temperature integral can be expressed by several special functions.•The special function models are more accurate than the numerical integration methods.•New rational approximations can be obtained by expansion of the special functions.•New iterative isoconversional method with very high accuracy is proposed. The non-isothermal analysis of reactions with a constant heating rate involves a temperature integral. This integral is popularized as the Arrhenius integral, but when the pre-exponential factor of the Arrhenius equation depends on temperature with a power-law relationship, the integral is known as the general temperature integral. In this paper, it is shown that when the activation energy and exponent of power-law assumed to be constant, these integrals can be expressed and evaluated by several kinds of special functions and using commercial or free softwares. The special functions include exponential integral function, incomplete gamma function, confluent hypergeometric function, Whittaker function and generalized hypergeometric function. New rational approximations can be obtained by expansion of the special functions. MATLAB and GNU Octave were used to compute the special function models as well as numerical integration. The accuracy of these methods was examined by variable precision arithmetic. For both softwares, the special function models showed higher accuracies compared to the numerical integration methods and the approximation functions. In addition, new iterative isoconversional method for constant activation energy and exponent of power-law has been proposed that shows very high accuracy in calculation of the activation energy.
Bibliography:ObjectType-Article-1
SourceType-Scholarly Journals-1
ObjectType-Feature-2
content type line 23
ISSN:0040-6031
1872-762X
DOI:10.1016/j.tca.2021.179034