Abstract
The problem of an elastic twice-truncated cone wave field estimation is considered for a steady state torsional oscillations. The G. Ya. Popov integral transformation with regard to an angular coordinate is applied. It allows the reduction of the original problem to a one-dimensional boundary value problem in the transformation’s domain. The solution of this boundary value problem is derived in an explicit form. The dependence of the eigenfrequencies on the cone’s geometric parameters is investigated.
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