A new method based on shifted Chebyshev series of the first kind is introduced to solve stiff linear/nonlinear systems of the point kinetics equations. The total time interval is divided into equal step sizes to provide approximate solutions. The approximate solutions require determination of the series coefficients at each step. These coefficients can be determined by equating the high derivatives of the Chebyshev series with those obtained by the given system. A new recurrence relation is introduced to determine the series coefficients. A special transformation is applied on the independent variable to map the classical range of the Chebyshev series from [-1,1] to [0,h]. The method deals with the Chebyshev series as a finite difference me...
An analytical solution of the point kinetics equations to calculate reactivity as a funcion of time ...
This report treats the numerical integration of the reactor kineties equations for one and two promp...
The research of a nuclear reactor model has been observed, where the system consists of two differen...
Abstract: Two explicit cyclic algorithms have been constructed in this paper for the probl...
Abstract: This work is devoted to the program complex for calculation of dynamic processes...
The numerical solution of the point kinetics equations in the presence of Newtonian temperature f...
Abstract: Some results of numerical experiments are described. They illustrate the possibi...
The point reactor kinetics equations of multi-group of delayed neutrons are a system of stiff ordina...
Abstract: Algorithms are obtained to compute spatial kinetics of nuclear reactor in diffus...
AbstractThis work deals with a new technique for the numerical integration of the system of differen...
Microcomputers are becoming increasingly popular in systems simulation because of their low cost and...
Exponential Time Differencing method with Taylor Series Expansion (ETD-TS) is used for solving nonli...
The system of point kinetics equations describes the time behaviour of a nuclear reactor, as-suming ...
In this paper, a new method that can be used for checking the proper implementation of time- or freq...
The material composition of nuclear fuel changes constantly due to nuclides transforming to other nu...
An analytical solution of the point kinetics equations to calculate reactivity as a funcion of time ...
This report treats the numerical integration of the reactor kineties equations for one and two promp...
The research of a nuclear reactor model has been observed, where the system consists of two differen...
Abstract: Two explicit cyclic algorithms have been constructed in this paper for the probl...
Abstract: This work is devoted to the program complex for calculation of dynamic processes...
The numerical solution of the point kinetics equations in the presence of Newtonian temperature f...
Abstract: Some results of numerical experiments are described. They illustrate the possibi...
The point reactor kinetics equations of multi-group of delayed neutrons are a system of stiff ordina...
Abstract: Algorithms are obtained to compute spatial kinetics of nuclear reactor in diffus...
AbstractThis work deals with a new technique for the numerical integration of the system of differen...
Microcomputers are becoming increasingly popular in systems simulation because of their low cost and...
Exponential Time Differencing method with Taylor Series Expansion (ETD-TS) is used for solving nonli...
The system of point kinetics equations describes the time behaviour of a nuclear reactor, as-suming ...
In this paper, a new method that can be used for checking the proper implementation of time- or freq...
The material composition of nuclear fuel changes constantly due to nuclides transforming to other nu...
An analytical solution of the point kinetics equations to calculate reactivity as a funcion of time ...
This report treats the numerical integration of the reactor kineties equations for one and two promp...
The research of a nuclear reactor model has been observed, where the system consists of two differen...