摘要:AbstractThe Goodwin oscillator is a simple yet instructive mathematical model, describing a wide range of self-controlled biological and biochemical processes, among which are self-inhibitory metabolic pathways and genetic circadian clocks that lead to important applications, such as thehormonalcycles modeling. Indeed, one of the first models of hormonal rhythm, squarely based on the conventional Goodwin oscillator, was suggested by W.R. Smith to describe the testosterone regulation in male and is often referred to as the Goodwin-Smith model. The Goodwin-Smith model describes an endocrine regulatory circuit, consisting of three hormones. Gonadotropin-releasing hormone controls the secretion of the luteinizing hormone, which influences the secretion of testosterone. In its turn, testosterone inhibits the secretion of gonadotropin, which effect is represented by the nonlinearfeedback.Further theoretical and experimental works on hormonal regulation revealed that the structure of this control circuit is in fact more complicated, since the testosterone directly influences the secretion of both precursor hormones. This motivates us to consider the modified Goodwin-Smith model with some additional negative feedback loop. The potential applications of such an extended model are not limited to hormonal regulation; similar models, where extra feedbacks can be either positive or negative, arise in metabolic reactions. We show that many basic properties of the Goodwin-Smith model retain their validity, after introducing an additional feedback, which include the existence and uniqueness of equilibria, Hopf bifurcation, and the existence of periodic solutions.
