Stability Analysis of a Delayed Immune Response Model to Viral Infection

The purpose of this work is the study of the qualitative behavior of the homogeneous in space solution of a delay differential equation arising from a model of infection dynamics. This study is mainly based on the monotone dynamical systems theory. Existence and smoothness of solutions are proved, and conditions of asymptotic stability of equilibriums in the sense of monotone dynamical systems are formulated. Then, sufficient conditions of global stability of the nonzero steady state are derived, for the two typical forms of the function f, specifying the efficiency of immune response-mediated virus elimination. Numerical simulations illustrate the analytical results. The obtained theoretical results have been applied, in a context of COVID-19 data calibration, to forecast the immunological behaviour of a real patient. © 2022, Foundation for Scientific Research and Technological Innovation.

Авторы
El Karkri J. , Boudchich F.1 , Volpert V. 2, 3, 4 , Aboulaich R.1
Издательство
Springer
Язык
Английский
Статус
Опубликовано
Год
2022
Организации
  • 1 Laboratory LERMA, Mohammadia School of Engineering, Mohammed V University in Rabat, Avenue Ibn Sina B.P 765, Agdal Rabat, 10090, Morocco
  • 2 Institut Camille Jordan, UMR 5208 CNRS, University Lyon 1, Villeurbanne, 69622, France
  • 3 Peoples Friendship University of Russia (RUDN University), 6 Miklukho-Maklaya St, Moscow, 117198, Russian Federation
  • 4 INRIA Team Dracula, INRIA Lyon La Doua, Villeurbanne, 69603, France
Ключевые слова
Delay differential equations; Exponential ordering; Global stability; Modeling of immune response; Monotone dynamical systems
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