Constant Approximation) for the poi

Constant Approximation) for the point kinetic equations in nuclear
reactor dynamics. McMohan and Pierson (2010) have also solved
neutron point kinetic equation using Taylor series method (TSM)
involving reactivity functions. Nahla (2008, 2010, 2011) presented
the analytical methods to solve nonlinear point kinetic equations.
Again Picca et al. (2013) have solved neutron point kinetic equation
by applying enhanced piecewise constant approximation
(EPCA) involving both linear and non-linear reactivity insertion.
Quintero-Leyva (2008) has also solved the neutron point kinetic
equation by a numerical algorithm CORE for a lumped and temperature
feedback. Patra and Saha Ray (2013b) have also solved neutron
point kinetic equation using Multi-step differential transform
method (Khan et al., 2012).
Wavelet analysis is a newly developed mathematical tool for
applied analysis, image manipulation and numerical analysis.
Wavelets have been applied in numerous disciplines such as image
compression, data compression, and many more (Chui, 1992;
Mallat, 2009). Among the different wavelet families mathematically
most simple are the Haar wavelets (Chen and Hsiao, 1997;
Debnath, 2007; Li and Zhao, 2010; Saha Ray, 2012; Saha Ray and
Patra, 2013a).
The Haar wavelets have the following features: (1) Orthogonal
and normalization, (2) having closed support and (3) the simple
expression (Mallat, 2009; Saha Ray, 2012). Due to simplicity, the
Haar wavelets are very effective for solving differential and integral
equations. Therefore, the main focus of the present paper is the