A stationary model of non-intersecting directed polymers

Abstract: We consider the partition function $Z_{\ell}(\vec x,0\vert \vec y,t)$ of $\ell$ non-intersecting continuous directed polymers of length $t$ in dimension $1+1$, in a white noise environment, starting from positions $\vec x$ and terminating at positions $\vec y$. When $\ell=1$, it is well known that for fixed $x$, the field $\log Z_1(x,0\vert y,t)$ solves the Kardar-Parisi-Zhang equation and admits the Brownian motion as a stationary measure. In particular, as $t$ goes to infinity, $Z_1(x,0\vert y,t)/Z_1(x,0\ve… Show more

“…Furthermore, periodic or two-sided boundary versions of Gibbsian line ensembles (e.g. related to versions of Schur processes as in [Bor07,BBNV18,BCY23]) will also likely play a key role in study of related integrable probabilistic models and hence warrant study in the spirit of what is done here.…”

An Identity in Distribution Between Full-Space and Half-Space Log-Gamma Polymers

“…Furthermore, periodic or two-sided boundary versions of Gibbsian line ensembles (e.g. related to versions of Schur processes as in [Bor07,BBNV18,BCY23]) will also likely play a key role in study of related integrable probabilistic models and hence warrant study in the spirit of what is done here.…”

An Identity in Distribution Between Full-Space and Half-Space Log-Gamma Polymers

Stationary measures for the log-gamma polymer and KPZ equation in half-space