Re-derivation and mathematical analysis for linear peridynamics model for arbitrary Poisson ratio's material

This paper is concerned with the modeling and mathematical analysis of linear peridynamic model for arbitrary Poisson ratio's material. Based on the fundamental laws of dynamics, we re-derive the bond-based peridynamic model for anisotropic materials by relaxing certain assumptions. Through this process, we draw several significant conclusions, such as the relationship between the equivalent strain energy density hypothesis and the convergence of the peridynamic operator to the classical Navier operator. Additionally, the well-posedness of time-dependent peridynamic equations of motion is established. Finally, some necessary conditions for the material stability of anisotropic material are given.