ON ONE CLASS OF FLOW SCHEMES FOR THE CONVECTION-DIFFUSION TYPE EQUATION

The object of the study was chosen finite-difference schemes for solving spatially one-dimensional equations such as convection-diffusion (CDU). These equations are used to describe many nonlinear processes in solids, liquids and gases. A new finite-difference approach to solving equations of this type is proposed in this paper. To simplify the discussion, a spatially one-dimensional version of the CDU is chosen. However, at the same time, the main features of the equation are preserved: nonmonotonicity and quasilinearity. To solve the boundary and initial-boundary value problems for KDU, flow schemes with double exponential transformation and algorithms for their implementation are proposed.