Local behavior and hitting probabilities of the Airy1 process

Jeremy Quastel, Daniel Remenik

Published 2012-01-23, updated 2012-04-13Version 3

We obtain a formula for the $n$-dimensional distributions of the Airy$_1$ process in terms of a Fredholm determinant on $L^2(\rr)$, as opposed to the standard formula which involves extended kernels, on $L^2(\{1,...,n\}\times\rr)$. The formula is analogous to an earlier formula of [PS02] for the Airy$_2$ process. Using this formula we are able to prove that the Airy$_1$ process is H\"older continuous with exponent $\frac12-$ and that it fluctuates locally like a Brownian motion. We also explain how the same methods can be used to obtain the analogous results for the Airy$_2$ process. As a consequence of these two results, we derive a formula for the continuum statistics of the Airy$_1$ process, analogous to that obtained in [CQR11] for the Airy$_2$ process.