Analytic Non-integrability of the Suslov Problem
نویسنده
چکیده
In this work we consider the Suslov problem, which consists of a rotation motion of a rigid body, whose center of mass is located at one axis of inertia, around a fixed point O in a constant gravity field restricted to a nonholonomic constraint. The integrability and non-integrability has been established by a number of authors for the nongeneric values of b = (b1, b2, b3) which is the unit vector along the line connecting the point O with the center of mass of the body. Here we prove the analytic non-integrability for the remaining (generic) values of b.
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