Abstract
We consider the asymptotic behavior of the KPZ fixed point conditioned on as L goes to infinity. The main result is a conditional limit theorem for the fluctuations of in the region near the line segment connecting the origin and for both step and flat initial conditions. The limit random field can be represented as a functional of two independent Brownian bridges, and in addition the limit random field depends also on the initial law of the KPZ fixed point. In particular for temporal fluctuations, the limit process indexed by line segment between and , when the KPZ is with step initial condition, has the law of the minimum of two independent Brownian bridges; and when the KPZ is with flat initial condition the limit process has the law of the minimum of two independent Brownian bridges, each in addition perturbed by a common Gaussian random variable. For spatial-temporal fluctuations, the conditional limit theorem sheds light on the asymptotic behaviors of the point-to-point geodesic of the directed landscape conditioned on its length and as the length tends to infinity.
Funding Statement
ZL’s research was partially supported by the University of Kansas Start Up Grant, the University of Kansas New Faculty General Research Fund, Simons Collaboration Grant No. 637861, and NSF grant DMS-1953687. YW’s research was partially supported by Army Research Office (W911NF-20-1-0139), USA.
Acknowledgments
The authors would like to thank Jinho Baik, Duncan Dauvergne, Shirshendu Ganguly, Yier Lin, Jeremy Quastel, and Daniel Remenik for very helpful comments and suggestions. In particular, we are grateful to Jinho Baik for pointing out to us an inaccurate assumption in Lemma 3.6 in an earlier version.
Citation
Zhipeng Liu. Yizao Wang. "A conditional scaling limit of the KPZ fixed point with height tending to infinity at one location." Electron. J. Probab. 29 1 - 27, 2024. https://doi.org/10.1214/24-EJP1092
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