Author:
Sahu P. K.,Ranjan A. K.,Saha Ray S.
Abstract
Abstract
Mathematical model for an adiabatic tubular chemical reactor which processes an irreversible exothermic chemical reaction has been considered. For steady state solution for an adiabatic tubular chemical reactor, the model can be reduced to ordinary differential equation with a parameter in the boundary conditions. Again the ordinary differential equation has been converted into a Hammerstein integral equation which can be solved numerically. B-spline wavelet method has been developed to approximate the solution of Hammerstein integral equation. This method reduces the integral equation to a system of algebraic equations. The numerical results obtained by the present method have been compared with the available results.
Subject
Computer Networks and Communications,General Engineering,Modeling and Simulation,General Chemical Engineering
Reference20 articles.
1. A Wavelet Tour of Signal Processing;Academic Press,1999
2. Numerical Approximate Solutions of Nonlinear Fredholm Integral Equations of Second Kind Using B-spline Wavelets and Variational Iteration Method;CMES,2013
3. A new approach based on semiorthogonal B-spline wavelets for the numerical solutions of the system of nonlinear Fredholm integral equations of second kind;Computational and Applied Mathematics,2014
4. The effect of activation energy on tubular reactor multiplicity;Chemical Engineering Science,1982
5. Wavelet Galerkin method for numerical solution of nonlinear integral equation;Applied Mathematics and Computation,2005
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