English

Defining Ideal Phantom Polymer Networks

Soft Condensed Matter 2026-05-26 v3

Abstract

Elastomers are modeled as networks with ϕ\phi -functional junctions containing NN ideal, nn-segment, freely jointed chains (FJCs) per unit volume (p.u.v.). Our compact model of the exact FJC length probability density (Treloar, 1975), accurately yields their exact distribution moments (Flory, 1969). The governing geometry of fluctuations of NX=2N/ϕN_X = 2N/\phi junctions p.u.v., parametrically maps their λ\lambda(elongation ratio)-dependent distribution to an equivalent FJC consisting of nfϕ=(n/ϕ)(1Λ)n_{f\phi} = (n/\phi)(1-\Lambda) segments, where Λ=(1/3n)(λ2+2/λ))\Lambda = (1/3n)(\lambda^2 + 2/\lambda)). The resulting elastic pre-factor, NeffkT=(NηNX)kTN_{\text{eff}}kT = (N - \eta N_X)kT, with junction effectiveness η=ϕ(1Λ)/(ϕΛ)\eta = \phi(1-\Lambda)/(\phi-\Lambda), defines ideal phantom networks

Cite

@article{arxiv.2405.16188,
  title  = {Defining Ideal Phantom Polymer Networks},
  author = {Hemant Nanavati and Sushanta Das},
  journal= {arXiv preprint arXiv:2405.16188},
  year   = {2026}
}

Comments

43 Pages (Including 12 Pages for Main Text (including title/abstract page and references), 31 Pages (including title page and references) for Supplementary Information), 28 Figures (including 22 in Supplementary Information, 1 table in Supplementary Information)

R2 v1 2026-06-28T16:40:07.215Z