Properties of given and detected unbounded solutions to a class of chemotaxis models

Abstract: This paper deals with unbounded solutions to a class of chemotaxis systems. In particular, for a rather general attraction–repulsion model, with nonlinear productions, diffusion, sensitivities, and logistic term, we detect Lebesgue spaces where given unbounded solutions also blow up in the corresponding norms of those spaces; subsequently, estimates for the blow‐up time are established. Finally, for a simplified version of the model, some blow‐up criteria are proved.More precisely, we analyze a zero‐flux chemo… Show more

“…Contributions by Russell [38] and Jurdjevic and Quinn [23] further enriched our understanding of controllability and stability in differential equations, emphasizing their connections to fractional integro-differential equations, ultimately aiming to bridge theoretical developments with practical applications. Columbu et al [8] studied properties of unbounded solutions in a class of chemotaxis models. Their work focuses on understanding the behavior and properties of solutions within this specific class of models, shedding light on potential instability in chemotaxis systems.…”

Existence and controllability results for neutral fractional Volterra-Fredholm integro-differential equations

“…Contributions by Russell [38] and Jurdjevic and Quinn [23] further enriched our understanding of controllability and stability in differential equations, emphasizing their connections to fractional integro-differential equations, ultimately aiming to bridge theoretical developments with practical applications. Columbu et al [8] studied properties of unbounded solutions in a class of chemotaxis models. Their work focuses on understanding the behavior and properties of solutions within this specific class of models, shedding light on potential instability in chemotaxis systems.…”

Existence and controllability results for neutral fractional Volterra-Fredholm integro-differential equations

“…The notion of neutral differential equations is the remarkable region in the research area of functional differential equations, with applications and mathematical contributions [6,22]. For abstract and partial neutral differential equations, we mention the work done in [4,9,39,40] and the articles [1,7,11,15].…”

Existence, uniqueness, and Hyers-Ulam stability of abstract neutral differential equation containing state-dependent fractional integrable impulses

“…The dynamical behavior of random fractional integro-differential equations has been studied by Begum et al [7], Dong et al [12], and Wang et al [42], enhancing our understanding of these complex systems. Columbu et al [10] studied properties of unbounded solutions in a class of chemotaxis models. Their work focuses on understanding the behavior and properties of solutions within this specific class of models, shedding light on potential instability in chemotaxis systems.…”

Analyzing existence, uniqueness, and stability of neutral fractional Volterra-Fredholm integro-differential equations