Statistics of Gaussian polymer chains in harmonic applied fields

Author(s)

Mikhail, John P; Rutledge, Gregory C

Abstract

The model of an ideal polymer chain in a harmonic applied field has broad applicability in situations involving polymer confinement and deformation due to applied stress. In this work we (1) formulate a general analytical model for a continuous Gaussian chain under a harmonic applied potential and (2) evaluate the statistical mechanics of this model given the potential, obtaining partition functions and moment generating functions (MGFs) that describe the chain configurations. Closed-form expressions for the squared radius of gyration, potential energy, partition function, and MGF for the center of mass are obtained for a general and multidimensional harmonic field. The expressions are compared with results of Monte Carlo simulations of a discrete Gaussian chain as well as results for related systems obtained from the literature. The theory derived here is used to test the applicability of the current model assumptions to relations from the literature describing polymer confinement and deformation in experiment, theory, and simulations.

Date issued

2024-05-29

URI

https://hdl.handle.net/1721.1/165490

Department

Massachusetts Institute of Technology. Department of Chemical Engineering
Massachusetts Institute of Technology. Institute for Soldier Nanotechnologies

Journal

Journal of Physics: Condensed Matter

Publisher

IOP Publishing

Citation

John P Mikhail and Gregory C Rutledge 2024 J. Phys.: Condens. Matter 36 345702

Version: Author's final manuscript