The Airy2 process and the 3D Ising model
From MaRDI portal
Publication:5879070
DOI10.1088/1751-8121/acb247OpenAlexW4317900057MaRDI QIDQ5879070
Senya B. Shlosman, Patrik Lino Ferrari
Publication date: 24 February 2023
Published in: Journal of Physics A: Mathematical and Theoretical (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2209.14047
Interacting random processes; statistical mechanics type models; percolation theory (60K35) Interface problems; diffusion-limited aggregation arising in equilibrium statistical mechanics (82B24) Lattice systems (Ising, dimer, Potts, etc.) and systems on graphs arising in equilibrium statistical mechanics (82B20)
Related Items
Asymptotics of noncolliding q-exchangeable random walks, Scaling limit for line ensembles of random walks with geometric area tilts, Bounded Bessel processes and Ferrari-Spohn diffusions
Uses Software
Cites Work
- Unnamed Item
- Unnamed Item
- Scaling limit and cube-root fluctuations in SOS surfaces above a wall
- Dyson Ferrari-Spohn diffusions and ordered walks under area tilts
- Differential equations for Dyson processes
- Large time asymptotics of growth models on space-like paths. I: Push ASEP
- Level-spacing distributions and the Airy kernel
- Scale invariance of the PNG droplet and the Airy process
- Step fluctuations for a faceted crystal
- Discrete polynuclear growth and determinantal processes
- Biorthogonal ensembles
- Constrained variational problem with applications to the Ising model.
- On the Wulff crystal in the Ising model.
- The Wulff construction in three and more dimensions
- An invariance principle to Ferrari-Spohn diffusions
- Local and global geometry of the 2D Ising interface in critical prewetting
- Critical prewetting in the 2d Ising model
- Eynard-Mehta theorem, Schur process, and their Pfaffian analogs
- 3D crystal: how flat its flat facets are?
- Constrained Brownian motion: fluctuations away from circular and parabolic barriers
- Confinement of Brownian polymers under geometric area tilts
- Formation of Facets for an Effective Model of Crystal Growth
- Bessel Functions: Monotonicity and Bounds
- Matrices coupled in a chain: I. Eigenvalue correlations
- Correlation function of Schur process with application to local geometry of a random 3-dimensional Young diagram
- Constrained non-crossing Brownian motions, fermions and the Ferrari–Spohn distribution
- Fluctuations in the Discrete TASEP with Periodic Initial Configurations and the Airy1 Process
