RNA matrix models with external interactions and their asymptotic behaviour

Abstract

We study a matrix model of RNA in which an external perturbation acts on n nucleotides of the polymer chain. The effect of the perturbation appears in the exponential generating function of the partition function as a factor (1-nαL) [where α is the ratio of strengths of the original to the perturbed term and L is length of the chain]. The asymptotic behaviour of the genus distribution functions for the extended matrix model are analyzed numerically when (i) n=L and (ii) n=1. In these matrix models of RNA, as nα/L is increased from 0 to 1, it is found that the universality of the number of diagrams aL, g at a fixed length L and genus g changes from 3L to (3-nαL)L (2L when nα/L=1) and the asymptotic expression of the total number of diagrams N at a fixed length L but independent of genus g, changes in the factor L to (1-nαL)L (exp0=1 when nα/L=1)