# Log-gamma directed polymer with one free end via coordinate Bethe Ansatz

**Authors:** Pascal Grange

arXiv: 1701.08606 · 2017-08-02

## TL;DR

This paper analyzes the log-gamma directed polymer with one free end using coordinate Bethe Ansatz, deriving the free energy distribution and connecting it to the GOE Tracy--Widom distribution, extending methods from fixed-end cases.

## Contribution

It extends the coordinate Bethe Ansatz approach to the log-gamma polymer with one free end, deriving the free energy distribution and relating it to the GOE Tracy--Widom distribution.

## Key findings

- Derived the large-time limit of the free energy distribution.
- Connected the distribution to the GOE Tracy--Widom distribution.
- Extended the Bethe Ansatz method to the free-end polymer case.

## Abstract

The discrete polymer model with random Boltzmann weights with homogeneous inverse gamma distribution, introduced by Sepp\"al\"ainen, is studied in the case of a polymer with one fixed and one free end. The model with two fixed ends has been integrated by Thiery and Le Doussal, using coordinate Bethe Ansatz techniques and an analytic-continuation prescription. The probability distribution of the free energy has been obtained through the replica method, even though the moments of the partition sum do not exist at all orders due to the fat tail in the distribution of Boltzmann weights. To extend this approach to the polymer with one free end, we argue that the contribution to the partition sums in the thermodynamic limit is localised on parity-invariant string states. This situation is analogous to the case of the continuum polymer with one free end, related to the Kardar--Parisi--Zhang equation with flat boundary conditions and solved by Le Doussal and Calabrese. The expansion of the generating function of the partition sum in terms of numbers of strings can also be transposed to the log-gamma polymer model, with the induced Fredholm determinant structure. We derive the large-time limit of the rescaled cumulative distribution function, and relate it to the GOE Tracy--Widom distribution. The derivation is conjectural in the sense that it assumes completeness of a family of string states (and expressions of their norms already used in the fixed-end problem) and extends heuristically the order of moments of the partition sum to the complex plane.

## Full text

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## Figures

6 figures with captions in the complete paper: https://tomesphere.com/paper/1701.08606/full.md

## References

52 references — full list in the complete paper: https://tomesphere.com/paper/1701.08606/full.md

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