Mathematical modelling of HTLV-I infection: a study of viral persistence in vivo

Lim, Aaron Guanliang

Unknown Date

No description available.

ordinary differential equations

mathematical modelling

global stability

compound systems

monotone dynamical systems

Poincare-Bendixson Theorem

Butler-McGehee Lemma

Lozinskii measure

backward bifurcation

HTLV-I

immunology

retrovirology

CD4+ helper T-cells

immune response

latently infected target cells

viral Tax protein

Mathematical modelling of HTLV-I infection: a study of viral persistence in vivo

Lim, Aaron Guanliang

11 1900

Human T-lymphotropic virus type I (HTLV-I) is a persistent human retrovirus characterized by life-long infection and risk of developing HAM/TSP, a progressive neurological and inflammatory disease. Despite extensive studies of HTLV-I, a complete understanding of the viral dynamics has been elusive. Previous mathematical models are unable to fully explain experimental observations. Motivated by a new hypothesis for the mechanism of HTLV-I infection, a three dimensional compartmental model of ordinary differential equations is constructed that focusses on the highly dynamic interactions among populations of healthy, latently infected, and actively infected target cells. Results from mathematical and numerical investigations give rise to relevant biological interpretations. Comparisons of these results with experimental observations allow us to assess the validity of the original hypothesis. Our findings provide valuable insights to the infection and persistence of HTLV-I in vivo and motivate future mathematical and experimental work. / Applied Mathematics

ordinary differential equations

mathematical modelling

global stability

compound systems

monotone dynamical systems

Poincare-Bendixson Theorem

Butler-McGehee Lemma

Lozinskii measure

backward bifurcation

HTLV-I

immunology

retrovirology

CD4+ helper T-cells

immune response

latently infected target cells

viral Tax protein