Analysis and optimal design of layered composites with high stiffness and high damping

In this paper we investigate the design of composite materials with simultaneously high stiffness and high damping. We consider layered composite materials with parallel plane layers made of a stiff constituent and a lossy polymer. We analyze the response of these composites to a dynamic load with a...

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Bibliographic Details
Published in:International journal of solids and structures 2013-05, Vol.50 (9), p.1342-1353
Main Authors: Meaud, Julien, Sain, Trisha, Hulbert, Gregory M., Waas, Anthony M.
Format: Article
Language:English
Subjects:
Composite materials
Constituents
Damping
Laminates
Mathematical analysis
Mathematical models
Multilayers
Optimization
Stiffness
Viscoelastic
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Summary:In this paper we investigate the design of composite materials with simultaneously high stiffness and high damping. We consider layered composite materials with parallel plane layers made of a stiff constituent and a lossy polymer. We analyze the response of these composites to a dynamic load with an arbitrary direction. Using the viscoelastic correspondence principle and linear frequency domain viscoelastic models, we derive an expression for the effective complex modulus of layered composites of infinite size at infinitesimal strains. The dependence of the effective dynamic modulus and loss factor on the geometrical parameters and on the tensile and bulk loss factors of the lossy constituent is analyzed. Moreover we determine the magnitude of the strains in the lossy constituent and demonstrate that the combination of high stiffness and high damping of these composites is due to the high normal and/or shear strains in the lossy material. We use nonlinear constrained optimization to design layered composites with simultaneously high stiffness and high damping while constraining the strains in the polymer. To determine the range of validity of the linear viscoelastic model, simulations using finite deformations models are compared to the theoretical results. Finally, we compute the effective properties of composites of finite size using finite element methods and determine the minimum size required to approach the formulae derived for composites of infinite size.
ISSN:0020-7683
1879-2146
DOI:10.1016/j.ijsolstr.2013.01.014