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Nuclear Technology Volume 193, 2016 - Issue 3
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Technical Note

Numerical Solution of Stochastic Point-Kinetics Neutron Equation with Fuzzy Parameters

S. NayakNational Institute of Technology Rourkela, Department of Mathematics, Odisha 769008, India
&
S. ChakravertyNational Institute of Technology Rourkela, Department of Mathematics, Odisha 769008, India
Pages 444-456 | Published online: 20 Mar 2017

REFERENCES

  • A. E. Aboanber and A. A. Nahla, “Generalization of the Analytical Inversion Method for the Solution of the Point Kinetics Equations,” J. Phys. A, 35, 3245 (2002); http://dx.doi.org/10.1088/0305-4470/35/14/307.
  • J. G. Hayes and E. J. Allen, “Stochastic Point-Kinetic Equations in Nuclear Reactor Dynamics,” Ann. Nucl. Energy, 32, 572 (2005); http://dx.doi.org/10.1016/j.anucene.2004.11.009.
  • D. L. Hetrick, Dynamics of Nuclear Reactors, University of Chicago Press, Chicago, Illinois (1971).
  • M. Kinard and E. J. Allen, “Efficient Numerical Solution of the Point Kinetics Equations in Nuclear Reactor Dynamics,” Ann. Nucl. Energy, 31, 1039 (2004); http://dx.doi.org/10.1016/j.anucene.2003.12.008.
  • D. J. Higham, “An Algorithmic Introduction to Numerical Simulation of Stochastic Differential Equations,” SIAM Rev., 43, 525 (2001); http://dx.doi.org/10.1137/S0036144500378302.
  • L. A. Zadeh, “Fuzzy Sets,” Inf. Control, 8, 338 (1965); http://dx.doi.org/10.1016/S0019-9958(65)90241-X.
  • H. J. Zimmermann, Fuzzy Sets Theory and Its Applications, Kluwer Academic Press, Dordrecht, Netherlands (1991).
  • S. Chakraverty and S. Nayak, “Non Probabilistic Solution of Uncertain Neutron Diffusion Equation for Imprecisely Defined Homogeneous Bare Reactor,” Ann. Nucl. Energy, 62, 251 (2013); http://dx.doi.org/10.1016Zj.anucene.2013.06.009.
  • T. Sauer, “Numerical Solution of Stochastic Differential Equation in Finance,” Handbook of Computational Finance, Part 4, pp. 529–550, Springer (2012).

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