Saha Ray, Santanu,
Fractional calculus with applications for nuclear reactors dynamics / Santanu Saha Ray, Department of Mathematics, National Institute of Technology Rourkela, Orissa, India. - 1 online resource
1. Mathematical methods in nuclear reactor physics -- 2. Neutron diffusion equation model in dynamical systems -- 3. Fractional order neutron point kinetic model -- 4. Numerical solution for deterministic classical and fractional order neutron point kinetic model -- 5. Classical and fractional order stochastic neutron point kinetic model -- 6. Solution for nonlinear classical and fractional order neutron point kinetic model with Newtonian temperature feedback reactivity -- 7. Numerical simulation using Haar Wavelet Operational method for neutron point kinetic equation involving imposed reactivity function -- 8. Numerical solution using two-dimensional Haar Wavelet collocation method for stationary neutron transport equation in homogeneous isotropic medium.
9780429075834
10.1201/b18684 doi
Fractional calculus.
QA314 / .S24 2016
515.83 / S131
Fractional calculus with applications for nuclear reactors dynamics / Santanu Saha Ray, Department of Mathematics, National Institute of Technology Rourkela, Orissa, India. - 1 online resource
1. Mathematical methods in nuclear reactor physics -- 2. Neutron diffusion equation model in dynamical systems -- 3. Fractional order neutron point kinetic model -- 4. Numerical solution for deterministic classical and fractional order neutron point kinetic model -- 5. Classical and fractional order stochastic neutron point kinetic model -- 6. Solution for nonlinear classical and fractional order neutron point kinetic model with Newtonian temperature feedback reactivity -- 7. Numerical simulation using Haar Wavelet Operational method for neutron point kinetic equation involving imposed reactivity function -- 8. Numerical solution using two-dimensional Haar Wavelet collocation method for stationary neutron transport equation in homogeneous isotropic medium.
9780429075834
10.1201/b18684 doi
Fractional calculus.
QA314 / .S24 2016
515.83 / S131