Bending control and instability of functionally graded dielectric elastomers

Abstract: A rectangular plate of dielectric elastomer exhibiting gradients of material properties through its thickness will deform inhomogeneously when a potential difference is applied to compliant electrodes on its major surfaces, because each plane parallel to the major surfaces will expand or contract to a different extent. Here we study the voltage-induced bending response of a functionally graded dielectric plate on the basis of the nonlinear theory of electro-elasticity, when both the elastic shear modulus and the electric permittivity change with the thickness coordinate. The theory is illustrated for a neo-Hookean electro-elastic energy function with the shear modulus and permittivity varying linearly across the thickness. We find that in general the bending angle increases with the potential difference provided the Hessian remains positive, but instability can arise as the potential difference increases and the Hessian vanishes. We derive the Hessian criterion for predicting the instability, and show how the material gradients can be tuned to control the bending shape, and to delay or promote the onset of the instability of the elastomer.