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Energy decay for damped shear beam model and new facts related to the classical Timoshenko system. (English) Zbl 1487.74072

Summary: In this paper, we consider a beam model known as Shear beam model (no rotary inertia). We assure, based on behavior of the wave speeds, that the Shear beam model corresponds to a part of the classical Timoshenko beam model which is governed only by one wave speed. Unlike the classical dissipative Timoshenko type system with viscous damping acting on transverse displacement, we prove that the corresponding dissipative Shear beam model has an energy exponential decay regardless any relationship between coefficients of the system. This happens because such model has only one finite wave speed for all wave numbers.

MSC:

74K10 Rods (beams, columns, shafts, arches, rings, etc.)
74H40 Long-time behavior of solutions for dynamical problems in solid mechanics
35Q74 PDEs in connection with mechanics of deformable solids
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References:

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