Enumeration of RNA complexes via random matrix theory
Abstract
In the present article, we review a derivation of the numbers of RNA complexes of an arbitrary topology. These numbers are encoded in the free energy of the Hermitian matrix model with potential V(x)=x^2/2−stx/(1−tx), where s and t are respective generating parameters for the number of RNA molecules and hydrogen bonds in a given complex. The free energies of this matrix model are computed using the so-called topological recursion, which is a powerful new formalism arising from random matrix theory. These numbers of RNA complexes also have profound meaning in mathematics: they provide the number of chord diagrams of fixed genus with specified numbers of backbones and chords as well as the number of cells in Riemann's moduli spaces for bordered surfaces of fixed topological type.
Additional Information
© The Authors. Journal compilation © 2013 Biochemical Society. Received 31 October 2012. P.S. thanks the Isaac Newton Institute for Mathematical Sciences, Cambridge, for hospitality. This work was supported by the Danish National Research Foundation Center of Excellence grant 'Center for Quantum Geometry of Moduli Spaces', the Marie-Curie IOF Fellowship and the Foundation for Polish Science.Additional details
- Eprint ID
- 38106
- Resolver ID
- CaltechAUTHORS:20130424-154833730
- Danish National Research Foundation Center of Excellence
- Marie Curie IOF Fellowship
- Foundation for Polish Science
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2013-04-25Created from EPrint's datestamp field
- Updated
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2021-11-09Created from EPrint's last_modified field