期刊
WAVE MOTION
卷 113, 期 -, 页码 -出版社
ELSEVIER
DOI: 10.1016/j.wavemoti.2022.102986
关键词
Nonlinear wave propagation; Metamaterials; Second gradient materials; Reduced order model
This paper investigates the possible modalities of non-linear wave propagation in planar pantographic sheets using a smaller length-scale lattice model and a macro multi-field 1D continuum model. Numerical simulations demonstrate the existence of several low dispersion waveforms in planar pantographic sheets, motivating further investigations in the subject.
Dynamics of pantographic sheets presents exotic aspects that deserve investigation. In this paper, we focus the attention on some possible modalities of non-linear wave propagation in planar pantographic sheets. We use a smaller length-scale lattice model, in which the beams and pivots constituting the sheet are described by constrained Euler- Bernoulli beams together with a meso-reduced-order model which belongs to the class of second-gradient elastic materials and with a macro multi-field 1D continuum model, whose displacement is augmented by a specific class of cross-section deformations. Such a three-step reduction process is developed to allow for fast computational analysis of symmetric wave propagation patterns with respect to the longitudinal axis of the sheet. It is conceived by using suitable kinematical hypotheses for the 1D continuum descriptors referring to pantographic sheet sections which are inspired by the numerical evidence obtained performing simulations based on the smaller scale lattice model. The deformation energy of the pantographic sheet, successfully postulated in dell'Isola et al. (2016) for a meso-reduced-order second gradient model, is pivotal in the whole model reduction process: It allows for the determination of generalized 1D deformation energy in terms of the mechanical properties of the micro-lattice model. Performed numerical simulations prove that several waveforms propagate in planar pantographic sheets with low dispersion and motivate further investigations in the subject.(c) 2022 Elsevier B.V. All rights reserved.
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