Quantum-statistical approach to gross properties of peripheral collisions between heavy nuclei

Abstract

Non-equilibrium quantum-statistical mechanics is applied to peripheral collisions between heavy nuclei (A≳40) where a large number of degrees of freedom are involved during the process. By eliminating the relative motion from the explicit consideration, the transitions between different channels are determined by a Liouville equation with timedependent coupling matrix elements. The introduction of subsets of channels (coarse graining) leads to the definition of macroscopic variables which correspond to observable quantities. The equation of motion for the macroscopic variables become irreversible by assuming the values of the coupling matrix elements to be randomly distributed. The validity and possible applications of the resulting master equations are discussed.