
We consider an infinite planar four-phase heterogeneous medium with three concentric circles as a boundary between isotropic medium's components of distinct resistivities/conductivities. It is supposed that the velocity field in this structure is generated by a finite set of arbitrary multipoles. We distinguish two cases when multipoles are inside of medium's components or at the interface. An exact analytical solution of the corresponding ${\mathbb R}$-linear conjugation boundary value problem is derived for both cases. Examples of flow nets (isobars and streamlines) are presented
${\mathbb R}$-linear conjugation problem, analytic functions, refraction, Математика, heterogeneous media
${\mathbb R}$-linear conjugation problem, analytic functions, refraction, Математика, heterogeneous media
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