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Mathematical modeling of the lysis of clots in blood vessels of convectiondiffusion equations. The fibrin clot is considered as an immobile solid phase, and the plasminogen, plasmin
Analysis of the Boundary Value and Control Problems for Nonlinear Reaction–Diffusion–Convection Equation
for the reaction–diffusion–convection equation are proved in the case when the reaction coefficient
nonlinearly
Mathematical modeling shows that the response of a solid tumor to antiangiogenic therapy depends on the type of growth and for the convective motion, arising due to their proliferation, thus allowing considering two types of tumor growth
Computational identification of adsorption and desorption parameters for pore scale transport in periodic porous media equations, coupled with convection–diffusion equation for species transport. The surface reactions, namely
Discontinuous Galerkin schemes for nonstationary convection-diffusion problems nonstationary convection- diffusion problem based on combination of discontinues Galerkin method for time
HDG schemes for stationary convection-diffusion problems© Published under licence by IOP Publishing Ltd.For stationary linear convection-diffusion problems
Mathematical modeling of the lysis of clots in blood vessels of convectiondiffusion equations. The fibrin clot is considered as an immobile solid phase, and the plasminogen, plasmin
Galerkin-petrov limit schemes for the convection-diffusion equation convection-diffusion equation. The method is based on the approximation of the integral identity that is used
Optimization of dose fractionation for radiotherapy of a solid tumor with account of oxygen effect and proliferative heterogeneityReaction-diffusion-convection equations
Combined influence of nutrient supply level and tissue mechanical properties on benign tumor growth as revealed by mathematical modeling. The convective motion of tissue elements happens due to the gradients of stress, which change as a result
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