Surface wrinkling of an elastic block subject to biaxial loading by an energy method (1803.03757v1)

Abstract: Wrinkles are often observed on the surfaces of compressed soft materials in nature. In the past few decades, the fascinating surface patterns have been studied extensively by using the linear bifurcation analysis under plane strain. The bifurcation concerns the non-uniqueness solutions, however, it delivers little information about the surface instability before and after the threshold. In this paper, we study surface wrinkling of a finite elastic block of general elastic materials subject to biaxial loading by an energy method. The first and second variations of the strain energy functional are systematically studied, and an eigenvalue problem is proposed whether the second variation is positive definite. We illustrate our analysis by using neo-Hookean materials as an example. Accordingly, we show that the initially flat state has the lowest energy and is stable before the stretches reach the threshold at which the surface wrinkling occurs. We also find that the threshold is independent of the size of the block and coincides with that of the surface instability of an elastic half-space studied by Biot (1963) with the linear bifurcation analysis. However, the stability region cannot be obtained by using the linear stability analysis. In contrast to the size-independent threshold, the wavelength of surface wrinkling depends on the size of the block. We first show that a two-dimensional rather than a three-dimensional perturbation has lower energy and is more likely to trigger the surface wrinkling in the instability region. The same stretch threshold of a finite block and a half-space could shed light on the relation of surface instabilities between finite and infinite bodies.