A novel method for solving a coagulation-fragmentation model with growth
Abstract
The global solvability of a nonlinear non-autonomous integro-differential equation describing coagulation-fragmentation processes with growth is investigated using a modified monotone method. Existence and uniqueness results are obtained thanks to Gronwall inequality. In particular, a new concept of upper-lower solution is introduced and the comparison principle established. A novel method for solving a coagulation-fragmentation model with growth.