Symmetry (Nov 2021)

Convergence on Population Dynamics and High-Dimensional Haddock Conjecture

  • Wenke Wang,
  • Le Li,
  • Xuejun Yi,
  • Chuangxia Huang

DOI
https://doi.org/10.3390/sym13122252
Journal volume & issue
Vol. 13, no. 12
p. 2252

Abstract

Read online

One fundamental step towards grasping the global dynamic structure of a population system involves characterizing the convergence behavior (specifically, how to characterize the convergence behavior). This paper focuses on the neutral functional differential equations arising from population dynamics. With the help of monotonicity techniques and functional methods, we analyze the subtle relations of both the ω-limited set and special point. Meanwhile, we prove that every bounded solution converges to a constant vector, as t tends to positive infinity. Our results correlate with the findings from earlier publications, and our proof yields an improved Haddock conjecture.

Keywords