Global boundedness and absorbing sets in two-dimensional chemotaxis-Navier-Stokes systems with weakly singular sensitivity and a sub-logistic source

This article presents a mathematical analysis of a complex system. The focus is on proving the existence of global solutions and identifying absorbing sets for a specific type of partial differential equation model. The use of 'weakly singular sensitivity' and 'sub-logistic source' suggests a nuanced and potentially challenging mathematical problem. The research likely contributes to the understanding of pattern formation and long-term behavior in chemotaxis models, which are relevant in biology and other fields.

• •The research investigates the long-term behavior of a chemotaxis-Navier-Stokes system.
• •It focuses on proving global boundedness of solutions.
• •The study involves weakly singular sensitivity and a sub-logistic source, indicating a complex mathematical model.