Title: Generalized Langevin dynamics for single beads in linear elastic network

Abstract: We derive generalized Langevin equations (GLEs) for single beads in linear elastic networks. In particular, the derivations of the GLEs are conducted without employing normal modes, resulting in two distinct representations in terms of resistance and mobility kernels. The fluctuation-dissipation relations are also confirmed for both GLEs. Subsequently, we demonstrate that these two representations are interconnected via Laplace transforms. Furthermore, another GLE is derived by utilizing a projection operator method, and it is shown that the equation obtained through the projection scheme is consistent with the GLE with the resistance kernel. Finally, as the simplest example, the present framework is applied to the Rouse model, and the GLEs with the resistance and mobility kernels are explicitly derived for arbitrary positions of the tagged bead in the Rouse chain.