Effects of diabaticity on fusion of heavy nuclei in the dinuclear model ...
Effects of diabaticity on fusion of heavy nuclei in the dinuclear model ...
Effects of diabaticity on fusion of heavy nuclei in the dinuclear model ...
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means a neglect <str<strong>on</strong>g>of</str<strong>on</strong>g> effects <str<strong>on</strong>g>of</str<strong>on</strong>g> c<strong>on</strong>figurati<strong>on</strong> changes <strong>on</strong> <strong>the</strong> mass parameters dur<strong>in</strong>g <strong>the</strong> evoluti<strong>on</strong><br />
<str<strong>on</strong>g>of</str<strong>on</strong>g> <strong>the</strong> nuclear shape <strong>in</strong> spite <str<strong>on</strong>g>of</str<strong>on</strong>g> <strong>the</strong> fact that <strong>the</strong> collective <strong>in</strong>ertia is str<strong>on</strong>gly <strong>in</strong>fluenced by level<br />
cross<strong>in</strong>gs (pseudo—cross<strong>in</strong>gs) [89, 90]. In order to overcome this problem, two—body collisi<strong>on</strong>s<br />
should be regarded which lead to a width <str<strong>on</strong>g>of</str<strong>on</strong>g> <strong>the</strong> s<strong>in</strong>gle particle levels and an effective reducti<strong>on</strong><br />
<str<strong>on</strong>g>of</str<strong>on</strong>g> <strong>the</strong> level cross<strong>in</strong>g effects. For example, calculati<strong>on</strong>s <str<strong>on</strong>g>of</str<strong>on</strong>g> <strong>the</strong> nuclear <strong>in</strong>ertia <strong>in</strong> a generalized<br />
crank<strong>in</strong>g <strong>model</strong> with pair<strong>in</strong>g correlati<strong>on</strong>s yielded masses <str<strong>on</strong>g>of</str<strong>on</strong>g> about <strong>on</strong>e order <str<strong>on</strong>g>of</str<strong>on</strong>g> magnitude larger<br />
than <strong>the</strong> <strong>on</strong>es without pair<strong>in</strong>g [91].<br />
One <str<strong>on</strong>g>of</str<strong>on</strong>g> <strong>the</strong> aims <str<strong>on</strong>g>of</str<strong>on</strong>g> this chapter is to obta<strong>in</strong> analytical expressi<strong>on</strong>s for mass parameters<br />
us<strong>in</strong>g <strong>model</strong>s and methods which <strong>in</strong>clude residual <strong>in</strong>teracti<strong>on</strong> effects. In sect. 5.1, <strong>the</strong> mass<br />
parameters are obta<strong>in</strong>ed with<strong>in</strong> <strong>the</strong> l<strong>in</strong>ear resp<strong>on</strong>se <strong>the</strong>ory, tak<strong>in</strong>g <strong>the</strong> fluctuati<strong>on</strong>-dissipati<strong>on</strong><br />
<strong>the</strong>orem and <strong>the</strong> width <str<strong>on</strong>g>of</str<strong>on</strong>g> s<strong>in</strong>gle particle states <strong>in</strong>to account. The same mass parameters are also<br />
derived by Fermi’s golden rule and by smooth<strong>in</strong>g <strong>the</strong> s<strong>in</strong>gle particle spectrum <strong>in</strong> <strong>the</strong> mean—field<br />
crank<strong>in</strong>g formula. In sect. 5.2, <strong>the</strong> mass parameters for <strong>the</strong> relevant collective variables (mass<br />
asymmetry, el<strong>on</strong>gati<strong>on</strong>, neck and deformati<strong>on</strong> parameters) <str<strong>on</strong>g>of</str<strong>on</strong>g> <strong>the</strong> DNS and str<strong>on</strong>gly deformed<br />
nuclear systems are evaluated <strong>in</strong> <strong>the</strong> two-center shell <strong>model</strong> with adiabatic and diabatic bases.<br />
5.1 Microscopical <strong>in</strong>ertia<br />
5.1.1 Derivati<strong>on</strong> from collective resp<strong>on</strong>se functi<strong>on</strong><br />
Let us c<strong>on</strong>sider a nuclear system described by a s<strong>in</strong>gle collective coord<strong>in</strong>ate Q and <strong>in</strong>tr<strong>in</strong>sic<br />
s<strong>in</strong>gle particle coord<strong>in</strong>ates x i (with <strong>the</strong> c<strong>on</strong>jugated momentum p i) and assume <strong>the</strong> follow<strong>in</strong>g<br />
effective Hamilt<strong>on</strong>ian [86]<br />
ˆH(xi,pi,Q)= ˆ H(xi,pi,Q0) +(Q − Q0) ˆ F (xi,pi,Q0)<br />
+ 1<br />
2 (Q − Q0) 2 < ∂2H(xi,pi,Q) ˆ<br />
∂Q2 . (5.1)<br />
>Q0,T0<br />
The shape <str<strong>on</strong>g>of</str<strong>on</strong>g> <strong>the</strong> nuclear mean field is changed with <strong>the</strong> collective coord<strong>in</strong>ate Q that <strong>in</strong>tro-<br />
duces <strong>the</strong> coupl<strong>in</strong>g between Q and <strong>the</strong> nucle<strong>on</strong>ic degrees <str<strong>on</strong>g>of</str<strong>on</strong>g> freedom x i. Eq. (5.1) is obta<strong>in</strong>ed<br />
by expand<strong>in</strong>g <strong>the</strong> Hamilt<strong>on</strong>ian to sec<strong>on</strong>d order <strong>in</strong> <strong>the</strong> vic<strong>in</strong>ity <str<strong>on</strong>g>of</str<strong>on</strong>g> Q0 (local harm<strong>on</strong>ic approx-<br />
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