Analytical Modeling and Validation of New Prismatic Compliant Joints Based on Zero Poisson’s Ratio Lattice Structures

Abstract

Abstract Prismatic compliant joints have received limited attention compared to revolute compliant joints, thus limiting their implementation in compliant mechanisms. Lattice structures have been used effectively to increase flexibility and stiffness ratios in compliant joints. Considering these, new prismatic compliant joints based on zero Poisson’s ratio lattice structures (ZP-PCJ) are proposed. Lattices with three different cell arrangements are considered: single cells, 2 × 2, and 3 × 3 lattices. Additionally, unit cells with three different geometries are studied: triangular, chamfer, and cosine. The compliance matrices of the ZP-PCJs are assembled analytically using Castigliano’s second theorem and compliance series-parallel simplification. The compliance ratios along the three orthogonal axes of the ZP-PCJs are computed varying their geometric parameters. Finite Element models are constructed to validate the analytical results. Finally, experimental tests are performed on additively manufactured ZP-PCJs to corroborate the compliance coefficients. Results showed that analytical models can predict the ZP-PCJ’s elastic properties accurately, differences less than 3% and 15% were obtained when compared to computational and experiments, respectively. The ZP-PCJs have advantages such as eliminating axis drift and high flexibility in motion direction while maintaining stiffness in other directions due to their symmetric arrangements (with respect to the motion direction) and their zero Poisson’s ratio. The analytical models of ZP-PCJs derived, showed excellent agreement when compared with simulations and experimental results, making them a reliable option when aiming to estimate their performance in compliant systems.