%0 Journal Article %T Stability analysis of general humoral immunity HIV dynamics models with discrete delays and HAART %A Elaiw, A. M. %A Elnahary, E. Kh. %J Journal of Mathematics and Computer Science %D 2018 %V 18 %N 4 %@ ISSN 2008-949X %F Elaiw2018 %X We investigate a general HIV infection model with three types of infected cells: latently infected cells, long-lived productively infected cells, and short-lived productively infected cells. We consider two kinds of target cells: CD4\(^{+}\) T cells and macrophages. We incorporate three discrete time delays into the model. Moreover, we consider the effect of humoral immunity on the dynamical behavior of the HIV. The HIV-target incidence rate, production/proliferation, and removal rates of the cells and HIV are represented by general nonlinear functions. We show that the solutions of the proposed model are nonnegative and ultimately bounded. We derive two threshold parameters which determine the stability of the three steady states of the model. Using Lyapunov functionals, we established the global stability of the steady states of the model. The theoretical results are confirmed by numerical simulations. %9 journal article %R 10.22436/jmcs.018.04.05 %U http://dx.doi.org/10.22436/jmcs.018.04.05 %P 430--452