Periodic contact between piezoelectric materials and a rigid body with a wavy surface |
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Authors: | Yue-Ting Zhou |
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Affiliation: | School of Mechanical Engineering, Hanyang University, Seoul 133-791, Republic of Korea |
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Abstract: | An exact analysis is conducted for periodic, two-dimensional (2D) contact of piezoelectric materials in contact with a rigid body with a wavy surface pressed by uniform stresses at infinity. For three cases of eigenvalue distribution, three harmonic functions automatically satisfying the periodicity conditions are carefully constructed to facilitate the derivation of the solution of the considered problem. The stresses and electric displacements are obtained as infinite series. It is found that for the full contact case, the disturbance stress and electric displacement fields remain only the first harmonic which has the slowest decay in the y-direction. The convergence behaviours of the infinite series are checked, which shows that the external loading p and different positions have a great effect on the convergence behaviours of the infinite series and 400 terms are enough to get accurate solution at each position. Numerical results are presented to justify the validity of the present derivation and show the effect of the external loading on the contact behaviours. |
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Keywords: | piezoelectric materials periodic contact wavy surface dual series equations critical loading |
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