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Polymer flow and polymer topology: linear chains, rings and knots flow differently

Presented by: 
Christos Likos Universität Wien
Date: 
Wednesday 13th February 2019 - 17:20 to 18:00
Venue: 
INI Seminar Room 2
Abstract: 
Modifications of the topological state of polymers are extremely interesting and relevant operations for a vast domain of scientific inquiry ranging from knot theory and polymer science all the way to materials science and biophysics, where cyclic and knotted DNA plays a key role in biological processes. Recent work has demonstrated that joining the two ends of a linear chain to form a cyclic (ring) polymer has a number of significant consequences in the structural [1,2] and rheological [3] properties of concentrated or semidilute solutions of the same. Accordingly, a number of questions arise regarding the behavior of linear, cyclic and knotted ring polymers under flow: how does the topology of the dissolved polymer affect its orientational resistance, as well as its rotation-, tumbling- or tank-treading motion under Couette flow? What consequences does shear flow have for knot localization along a sheared polymer? Can one make use of the different flow properties of various polymer topologies to build microfluidic devices that
act as filters/separators of topologically different polymers? By applying hybrid act as filters/separators of topologically different polymers? By applying hybrid (MPCD/MD) simulation techniques that take into account the hydrodynamics, we address the questions above for polymers of varying topologies, knotedness and the questions above for polymers of varying topologies, knotedness and stiffness and we analyze quantitatively the influence of polymer topology on singlepolymer properties under flow [4]. Polymer properties under Poiseuille flow will also be analyzed and on this basis concrete suggestions for the construction of topologyseparating microfluidic devices will be presented [5].
[References
[1] M. Z. Slimani, P. Bacova, M. Bernabei, A. Narros, C. N. Likos, and A. J. Moreno, ACS Macro
Letters {\bf 3}, 611 (2014).
[2] P. Poier, S. A. Egorov, C. N. Likos and R. Blaak, Soft Matter {\bf 12}, 7983 (2016).
[3] M. Kapnistos, M. Lang, D. Vlassopoulos, W. Pyckhout-Hintzen, D. Richter,
D. Cho, T. Chang, and M. Rubinstein, Nature Materials {\bf 7}, 997 (2008).
[4] M. Liebetreu and C. N. Likos, in preparation (2017).
[5] L. Weiß, A. Nikoubashman, and C. N. Likos, in preparation (2017).

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    Clay Mathematics Institute London Mathematical Society NM Rothschild and Sons