BOUNDARY VALUE PROBLEM OF TWO-DIMENSIONAL FILTRATION OF A LIQUID IN AN INHOMOGENEOUS LAYER WITH A BOUNDARY CONDITION OF DISCONTINUITY OF THE FIRST KIND

The first boundary value problems (internal and external) of a two-dimensional filtration flow of a liquid in a non-uniform porous layer of variable thickness and permeability are investigated. The given discrete sources of the flow are located in the flow region and are modeled by singularities (isolated special points) of a complex potential. The boundary of the flow region is modeled by an arbitrary smooth (piecewise smooth) closed contour. A function is specified on the boundary that characterizes the pressure distribution on it and has discontinuities of the first kind. A method for regularizing (smoothing) the boundary condition is proposed, which allows reducing the problems to a boundary singular integral equation with a weak singularity and a smooth right-hand side. This regularization method is applied to the solution of a boundary value problem, simulating the operation of a system of wells in a heterogeneous layer (formation) of soil, on the supply contour of which a given pressure distribution (generalized potential) suffers discontinuities of the first kind.

two-dimensional boundary filtration problem, inhomogeneous layer, generalized boundary condition with singularities, boundary singular integral equation