Topological interactions in systems of mutually interlinked polymer rings
Abstract
The topological interaction arising in interlinked polymeric rings such as DNA catenanes is considered. More specifically, the free energy for a pair of linked random walk rings is derived where the distance R between two segments each of which is part of a different ring is kept constant. The topology conservation is imposed by the Gauss invariant. A previous approach (M.Otto, T.A. Vilgis, Phys.Rev.Lett. 80, 881 (1998)) to the problem is refined in several ways. It is confirmed, that asymptotically, i.e. for large R RG where RG is average size of single random walk ring, the effective topological interaction (free energy) scales R4.
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