Coagulation with product kernel and arbitrary initial conditions: Exact kinetics within the Marcus-Lushnikov framework

Abstract

The time evolution of a system of coagulating particles under the product kernel and arbitrary initial conditions is studied. Using the improved Marcus-Lushnikov approach, the master equation is solved for the probability W(Q,t) to find the system in a given mass spectrum Q=\n1,n2,…,ng…\, with ng being the number of particles of size g. The exact expression for the average number of particles, ng(t), at arbitrary time t is derived and its validity is confirmed in numerical simulations of several selected initial mass spectra.