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Posted: Dec 06, 2017
Nanomaterials: How to separate linear and ring-shaped molecules
(Nanowerk News) The purely mathematical property – linear or circular – can have severe consequences in the world of materials. Since circular molecules lack any ends, which could serve as a starting point for degradation, they are more resistant and less entangled. Nature profits from this unique property of circular molecules to increase DNA’s and RNA’s resilience against degradation.
Topology plays not only a role in biology but as well when molecules get out of equilibrium: Linear and ring molecules flow differently, as do their mixtures.
This difference in flow can be explained using spaghetti as an analogy for linear molecules and stirring a pot of them as analogy for flow: Single noodles elongate in flow direction, although they are still entangled.
The view into the canal perpendicular to the flow direction. The fluid and the flow profile are represented by the blue background and the vector graphics. (Image: Lisa Weiss)
Imagine, we now stir ring-shaped pasta corresponding to spaghetti with ends glued together: Circular pasta orients more easily in flow direction compared to linear Spaghetti and rings are less entangled, making stirring easier.
Nevertheless, separating a mixture of linear and ring-shaped pasta in one pot into two separated systems of high purity is a challenging task, since the molecular building blocks are exactly the same. Both noodle topologies are made of the same dough. Tediously, we have to hand-pick one by one to distinguish if it is a spaghetto or a ring-shaped noodle.
Such a process is impossible on a microscopic scale, hence the development of new materials based on different topologies is hindered, as well as the analysis of topology in biological systems. Therefore, we need new and efficient separation technologies.
The individual green points represent the attractive points in the channel, rings are shown in red, linear chains in blue. An arrow indicates the rolling motion of the rings. (Image: Lisa Weiss)
Using computer simulations, they prove the effectiveness of microfluidic channels decorated with attractive spots. Those spots attract equally strongly the molecular building blocks of linear and ring molecules.
Lisa Weiss of the Computational Physics Group at the University of Vienna explains that linear chains are immobilized on these spots, whereas ring molecules can roll along them, this rolling motion being possible only for topologies with a closed contour line.
To purify the filter of the stuck chains, the channel is flushed with a non-solvent for the chains, i.e., a solvent in which the molecules cannot dissolve – as for example oil in water. Therefore, chains crumble and detach and, subsequently, the flow carries off the chains and the filter is clean.