Melting and unzipping of DNA
| Autor: | Luca Peliti, David Mukamel, Yariv Kafri |
|---|---|
| Přispěvatelé: | Y., Kafri, D., Mukamel, Peliti, Luca, D., Makumel |
| Rok vydání: | 2002 |
| Předmět: |
chemistry.chemical_classification
Physics Physics::Biological Physics Quantitative Biology::Biomolecules Phase transition Statistical Mechanics (cond-mat.stat-mech) FOS: Physical sciences Polymer Condensed Matter - Soft Condensed Matter Condensed Matter Physics Quantitative Biology Electronic Optical and Magnetic Materials chemistry Chain (algebraic topology) Chemical physics FOS: Biological sciences Soft Condensed Matter (cond-mat.soft) Molecule Denaturation (biochemistry) A-DNA Scaling Quantitative Biology (q-bio) Condensed Matter - Statistical Mechanics Topology (chemistry) |
| Zdroj: | Scopus-Elsevier |
| Popis: | Experimental studies of the thermal denaturation of DNA yield a strong indication that the transition is first order. This transition has been theoretically studied since the early sixties, mostly within an approach in which the microscopic configurations of a DNA molecule are given by an alternating sequence of non-interacting bound segments and denaturated loops. Studies of these models neglect the repulsive, self-avoiding, interaction between different loops and segments and have invariably yielded continuous denaturation transitions. In this study we exploit recent results on scaling properties of polymer networks of arbitrary topology in order to take into account the excluded-volume interaction between denaturated loops and the rest of the chain. We thus obtain a first-order phase transition in d=2 dimensions and above, in agreement with experiments. We also consider within our approach the unzipping transition, which takes place when the two DNA strands are pulled apart by an external force acting on one end. We find that the unzipping transition is also first order. Although the denaturation and unzipping transitions are thermodynamically first order, they do exhibit critical fluctuations in some of their properties. For instance, the loop size distribution decays algebraically at the transition and the length of the denaturated end segment diverges as the transition is approached. We evaluate these critical properties within our approach. 12pages,8 figures, REVTEX4 |
| Databáze: | OpenAIRE |
| Externí odkaz: |
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