CARJAN, N.; RIZEA, M.

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CARJAN, N.
Physique théorique [THEORIE]

RIZEA, M.
Horia Hulubei National Institute of Physics and Nuclear Engineering [NIPNE]

Language

Article de revue

This item was published in

Romanian Journal of Physics. 2012, vol. 57, p. 92-105

Romanian Academy Publishing House

English Abstract

We study the transition of the fissioning nucleus from the saddle to the scission point through a dynamical approach. It involves the numerical solution of the bi-dimensional time-dependent Schr¨odinger equation (TDSE) with time-dependent potential. The axially symmetric extremely deformed nuclear shapes are described by modified Cassini ovals. The Hamiltonian in cylindrical coordinates and z is discretized by using special finite difference approximations of the derivatives. The initial wave-functions for TDSE are the eigen-solutions of the stationary Schr¨odinger equation whose potential corresponds to the saddle point deformation. The TDSE is solved by a Crank-Nicolson method associated with transparent conditions at numerical boundaries. The time evolution is calculated until the neck connecting the primary fission fragments suddenly breaks. The numerical solutions have been used to evaluate relevant scission properties in the case of the fissioning nucleus 236U.Read less <

English Keywords

adapted finite differences

low-energy nuclear fission

saddle-to-scission

neutrons

excitation energy

multiplicity

bi-dimensional Schr¨odinger equation

stationary

time-dependent

adapted finite differences.

Origin

Hal imported

Collections

Centre d'Études Nucléaires de Bordeaux Gradignan (CENBG)