Extremal geometry of a Brownian porous medium
From MaRDI portal
Publication:466895
DOI10.1007/s00440-013-0525-9zbMath1327.60037arXiv1211.3630OpenAlexW2160708355MaRDI QIDQ466895
Jesse Goodman, W. Th. F. den Hollander
Publication date: 31 October 2014
Published in: Probability Theory and Related Fields (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1211.3630
Brownian motioncapacitylarge deviation principlecover timerandom setlargest inradiusprincipal Dirichlet eigenvalue
Geometric probability and stochastic geometry (60D05) Brownian motion (60J65) Large deviations (60F10)
Related Items (7)
Two-dimensional random interlacements and late points for random walks ⋮ Percolative properties of Brownian interlacements and its vacant set ⋮ Torsional rigidity for regions with a Brownian boundary ⋮ The subleading order of two dimensional cover times ⋮ Heat content and inradius for regions with a Brownian boundary ⋮ How round are the complementary components of planar Brownian motion? ⋮ Two-dimensional Brownian random interlacements
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- The growth constants of lattice trees and lattice animals in high dimensions
- Area versus capacity and solidification in the crushed ice model
- Soft local times and decoupling of random interlacements
- Vacant set of random interlacements and percolation
- Strong spherical asymptotics for rotor-router aggregation and the divisible sandpile
- Exit times of Brownian motion, harmonic majorization, and Hardy spaces
- Heat equation on the arithmetic von Koch snowflake
- Brownian motion on compact manifolds: cover time and late points
- Cover times for Brownian motion and random walks in two dimensions
- On scaling limits and Brownian interlacements
- Giant component and vacant set for random walk on a discrete torus
- Heat content and inradius for regions with a Brownian boundary
- On the fragmentation of a torus by random walk
- Percolation for the vacant set of random interlacements
- Asymptotics for the Heat Content of a Planar Region with a Fractal Polygonal Boundary
- Cell Growth Problems
- Isoperimetric Inequalities in Mathematical Physics. (AM-27)
- Moderate deviations for the volume of the Wiener sausage
This page was built for publication: Extremal geometry of a Brownian porous medium
