Skip to main content

Nonlinear rheometry of entangled polymeric rings and ring-linear blends.

Publication ,  Journal Article
Parisi, D; Kaliva, M; Costanzo, S; Huang, Q; Lutz, PJ; Ahn, J; Chang, T; Rubinstein, M; Vlassopoulos, D
Published in: Journal of rheology
July 2021

We present a comprehensive experimental rheological dataset for purified entangled ring polystyrenes and their blends with linear chains in nonlinear shear and elongation. In particular, data for shear stress growth coefficient, steady-state shear viscosity, and first and second normal stress differences are obtained and discussed as functions of shear rate as well as molecular parameters (molar mass, blend composition and decreasing molar mass of linear component in blend). Over the extended parameter range investigated, rings do not exhibit clear transient undershoot in shear, in contrast to their linear counterparts and ring-linear blends. For the latter, the size of the undershoot and respective strain appear to increase with shear rate. Universal scaling of strain at overshoot and fractional overshoot (ratio of maximum to steady-state shear stress growth coefficient) indicates subtle differences in the shear-rate dependence between rings and linear polymers or their blends. The shear thinning behaviour of pure rings yields a slope nearly identical to predictions (-4/7) of a recent shear slit model and molecular dynamics simulations. Data for the second normal stress difference are reported for rings and ring-linear blends. While N2 is negative and its absolute value stays below that of N1 , as for linear polymers, the ratio -N2/N1 is unambiguously larger for rings compared to linear polymer solutions with the same number of entanglements (almost by factor of two), in agreement with recent non-equilibrium molecular dynamics simulations. Further, -N2 exhibits slightly weaker shear rate dependence compared to N1 at high rates, and the respective power-law exponents can be rationalized in view of the slit model (3/7) and simulations (0.6), although further work is needed to unravel the molecular original of the observed behaviour. The comparison of shear and elongational stress growth coefficients for blends reflects the effect of ring-linear threading which leads to significant viscosity enhancement in elongation. Along the same lines, the elongational stress is much larger than the first normal stress in shear, and their ratio is much larger for rings and ring-linear blends compared to linear polymers. This conforms the interlocking scenario of rings and their important role in mechanically reinforcing linear matrices.

Duke Scholars

Altmetric Attention Stats
Dimensions Citation Stats

Published In

Journal of rheology

DOI

EISSN

1520-8516

ISSN

0148-6055

Publication Date

July 2021

Volume

65

Issue

4

Start / End Page

695 / 711

Related Subject Headings

  • Polymers
  • 4012 Fluid mechanics and thermal engineering
  • 0915 Interdisciplinary Engineering
  • 0913 Mechanical Engineering
  • 0904 Chemical Engineering
 

Citation

APA
Chicago
ICMJE
MLA
NLM
Parisi, D., Kaliva, M., Costanzo, S., Huang, Q., Lutz, P. J., Ahn, J., … Vlassopoulos, D. (2021). Nonlinear rheometry of entangled polymeric rings and ring-linear blends. Journal of Rheology, 65(4), 695–711. https://doi.org/10.1122/8.0000186
Parisi, Daniele, Maria Kaliva, Salvatore Costanzo, Qian Huang, Pierre J. Lutz, Junyoung Ahn, Taihyun Chang, Michael Rubinstein, and Dimitris Vlassopoulos. “Nonlinear rheometry of entangled polymeric rings and ring-linear blends.Journal of Rheology 65, no. 4 (July 2021): 695–711. https://doi.org/10.1122/8.0000186.
Parisi D, Kaliva M, Costanzo S, Huang Q, Lutz PJ, Ahn J, et al. Nonlinear rheometry of entangled polymeric rings and ring-linear blends. Journal of rheology. 2021 Jul;65(4):695–711.
Parisi, Daniele, et al. “Nonlinear rheometry of entangled polymeric rings and ring-linear blends.Journal of Rheology, vol. 65, no. 4, July 2021, pp. 695–711. Epmc, doi:10.1122/8.0000186.
Parisi D, Kaliva M, Costanzo S, Huang Q, Lutz PJ, Ahn J, Chang T, Rubinstein M, Vlassopoulos D. Nonlinear rheometry of entangled polymeric rings and ring-linear blends. Journal of rheology. 2021 Jul;65(4):695–711.

Published In

Journal of rheology

DOI

EISSN

1520-8516

ISSN

0148-6055

Publication Date

July 2021

Volume

65

Issue

4

Start / End Page

695 / 711

Related Subject Headings

  • Polymers
  • 4012 Fluid mechanics and thermal engineering
  • 0915 Interdisciplinary Engineering
  • 0913 Mechanical Engineering
  • 0904 Chemical Engineering