Abstract
The problem of the effect of a uniformly moving local load distributed over circular regions on a slightly curved, isotropic shell of positive Gaussian curvature is solved, where the density of the load distribution is given in the form of a power function with an integer exponent μ. Two cases are considered: μ = 0, corresponding to a load distributed uniformly over a circular area, and μ = –1. The solutions are analyzed as functions of the radius of the circular region over which the load is distributed, the geometry of the shell, and the velocity of motion of the load.
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