Nuclear Incompressibility at Finite Temperature and Entropy
Abstract
Features of the nuclear isothermal incompressibility and adiabatic incompressibility Q are investigated. The calculations are done at zero and finite temperatures and non zero entropy and for several equations of state. It is shown that Q decreases with increasing entropy while the isothermal increases with increasing T. A duality is found between the adiabatic Q and the T=0 isothermal . Our isothermal results are compared with a recent lattice Monte Carlo calculation done at finite T. The necessity of including correlations is shown if is to have a peak with increasing T as seen in the Monte Carlo calculations. A peak in is linked to attractive scattering correlations in two nucleons channel in the virial expansion in our approach which are Pauli blocked at low T.
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