Polydisperse Telechelic Polymers at Interfaces: Analytic Results and Density Functional Theory
(2012) In Langmuir 28(9). p.4223-4232- Abstract
- We use a recently developed continuum theory to expand on an exact treatment of the interfacial properties of telechelic polymers displaying Schulz-Flory polydispersity. Our results are remarkably compact and can be derived from the properties of equilibrium, ideal polymers at interfaces. A new surface adsorption transition is identified for ideal telechelic chains, wherein the central block is an equilibrium polymer. This transition occurs in the limit of strong end adsorption. Additionally, closed expressions are derived for the ideal continuum telechelic chain in contact with two large spheres, using the Derjaguin approximation. We analyze the interactions between colloids as a function of polydispersity and molecular weight, and the... (More)
- We use a recently developed continuum theory to expand on an exact treatment of the interfacial properties of telechelic polymers displaying Schulz-Flory polydispersity. Our results are remarkably compact and can be derived from the properties of equilibrium, ideal polymers at interfaces. A new surface adsorption transition is identified for ideal telechelic chains, wherein the central block is an equilibrium polymer. This transition occurs in the limit of strong end adsorption. Additionally, closed expressions are derived for the ideal continuum telechelic chain in contact with two large spheres, using the Derjaguin approximation. We analyze the interactions between colloids as a function of polydispersity and molecular weight, and the results are compared with polymer density functional theory in the dilute limit. Significant variations in polymer mediated forces are observed as a function of polydispersity, molecuar weight, and chain stiffness. (Less)
Please use this url to cite or link to this publication:
https://lup.lub.lu.se/record/2517069
- author
- Forsman, Jan LU and Woodward, Clifford E.
- organization
- publishing date
- 2012
- type
- Contribution to journal
- publication status
- published
- subject
- in
- Langmuir
- volume
- 28
- issue
- 9
- pages
- 4223 - 4232
- publisher
- The American Chemical Society (ACS)
- external identifiers
-
- wos:000301038000023
- scopus:84857892285
- pmid:22273547
- ISSN
- 0743-7463
- DOI
- 10.1021/la204576q
- language
- English
- LU publication?
- yes
- additional info
- The information about affiliations in this record was updated in December 2015. The record was previously connected to the following departments: Theoretical Chemistry (S) (011001039)
- id
- b70f7387-1edc-4d04-9375-63fa273633f6 (old id 2517069)
- date added to LUP
- 2016-04-01 10:09:45
- date last changed
- 2023-01-02 01:46:17
@article{b70f7387-1edc-4d04-9375-63fa273633f6, abstract = {{We use a recently developed continuum theory to expand on an exact treatment of the interfacial properties of telechelic polymers displaying Schulz-Flory polydispersity. Our results are remarkably compact and can be derived from the properties of equilibrium, ideal polymers at interfaces. A new surface adsorption transition is identified for ideal telechelic chains, wherein the central block is an equilibrium polymer. This transition occurs in the limit of strong end adsorption. Additionally, closed expressions are derived for the ideal continuum telechelic chain in contact with two large spheres, using the Derjaguin approximation. We analyze the interactions between colloids as a function of polydispersity and molecular weight, and the results are compared with polymer density functional theory in the dilute limit. Significant variations in polymer mediated forces are observed as a function of polydispersity, molecuar weight, and chain stiffness.}}, author = {{Forsman, Jan and Woodward, Clifford E.}}, issn = {{0743-7463}}, language = {{eng}}, number = {{9}}, pages = {{4223--4232}}, publisher = {{The American Chemical Society (ACS)}}, series = {{Langmuir}}, title = {{Polydisperse Telechelic Polymers at Interfaces: Analytic Results and Density Functional Theory}}, url = {{http://dx.doi.org/10.1021/la204576q}}, doi = {{10.1021/la204576q}}, volume = {{28}}, year = {{2012}}, }