The asymptotic solution of the problem of a thin three-dimensional body entering a compressible fluid

The asymptotic form of Green's vector function with a pole on the boundary is calculated by the method of matched asymptotic expansions. The expansion obtained is used to construct the asymptotic form of the contact pressure. The equations of the contact problem are derived with integral corrections

Based on the delinitions of three .fixed centres in a four-dimensional space, a three-dimensional sohttion of the' problem of three fixed centres is presented, whk'h develops the plane sohttion of the problem.

The motion of a mass point in the gravitational field of two bodies traveling along arbitrary orbits about their center of mass is considered. The mass ratio of the two bodies is equal to e 1. When the mass point passes close to the smaller mass, the character of its trajectory changes abruptly, and

The equilibrium of linearly-elastic elongated bodies (rods) with an extremely arbitrary geometry and structure subjected to the effects of force and heat is considered. Owing to the presence of a small parameter--the relative thickness--this is a singularly perturbed problem. The asymptotic analysis