Two Lil-type results for the Brownian bridge

We consider \(\mathbb{R}^{2}\)-valued Gaussian random fields over \(\mathbb{R}^{2}\), realizing the free electromagnetic field. We associate to them stochastic holonomy operators, by integrating along compositions of \(C^{1}\) curves from an initial point \(x\) (time 0 ) in \(\mathbb{R}^{2}\) to a f

Pemantle, R. and M.D. Penrose, On path integrals for the high-dimensional Brownian bridge, Journal of Computational and Applied Mathematics 44 (1992) 381-390. Let u be a bounded function with bounded support in [w d, d > 3. Let x, y E Rd. Let Z(t) denote the path integral of u along the path of a Br

The configurations and interactions in a system of particles connected by liquid bridges are investigated. The basic phenomena have been elucidated using two-dimensional models with equal sized particles. With this restriction all possible contact configurations can be obtained by considering three