Mathematical Modeling of the Immune Response

Mathematical models in immunology mathematical methods used modeling immune system features models of diseases infectious diseases AIDS cancer models of immunological techniques modeling network theory Richter's model Hoffmann's model overview of mathematical models of immune response Hege's and Cole's model Marchalonis' and Gledhill's model Dibrov's model Bell's model work of Mohler's and Bruni's groups multicompartmental model Merrill's model models of Kaufman and Thomas Beck's model threshold models model of tolerance Grossmann's model models of Marchuk and his co-workers Marchuk's model "The Simplest Model" temperature reaction polyinfections further modifications of the simplest model the more complex model bacterial diseases model of AIDS production of lymphocytes during infectious disease stochastic version of Marchuk's model Janenko's model Alperin's model Prague models X-Y-Z scheme model A first Prague model discrete time model Klein's model on the immune response description of the modeled reality immunity immune system immune response memory tolerance dose-dependent tolerance autotolerance autoimmunity therapy of autoimmune disease immunosuppression extracorporeal removal of antibody the way of regulation interleukin 2 regulation of B cell growth. Part contents.