Localization of a one-dimensional simple random walk among power-law renewal obstacles

Abstract: We consider a one-dimensional simple random walk killed by quenched soft obstacles. The position of the obstacles is drawn according to a renewal process with a power-law increment distribution. In a previous work, we computed the large-time asymptotics of the quenched survival probability. In the present work we continue our study by describing the behaviour of the random walk conditioned to survive. We prove that with large probability, the walk quickly reaches a unique time-dependent optimal gap that is fre… Show more

“…Loosely speaking, these are nearly spherical pockets of rough size (log ℓ) 1 d with a rarefied presence of the obstacles that underpin low eigenvalues. Various facets of these questions emerge in related studies concerning Brownian motion in a Poissonian potential and kindred models, see [28], [17], [2], and references therein, as well as [6], [5], and [25] for some recent developments. Here we have a different purpose.…”

On the spectral gap in the Kac-Luttinger model and Bose-Einstein condensation

“…Loosely speaking, these are nearly spherical pockets of rough size (log ℓ) 1 d with a rarefied presence of the obstacles that underpin low eigenvalues. Various facets of these questions emerge in related studies concerning Brownian motion in a Poissonian potential and kindred models, see [28], [17], [2], and references therein, as well as [6], [5], and [25] for some recent developments. Here we have a different purpose.…”

On the spectral gap in the Kac-Luttinger model and Bose-Einstein condensation