Das Gesetz des iterierten Logarithmus für kumulative Prozesse.
Decay of covariances, uniqueness of ergodic component and scaling limit for a class of systems with non-convex potential
We consider a gradient interface model on the lattice with interaction potential which is a non-convex perturbation of a convex potential. Using a technique which decouples the neighboring vertices into even and odd vertices, we show for a class of non-convex potentials: the uniqueness of ergodic component for -Gibbs measures, the decay of covariances, the scaling limit and the strict convexity of the surface tension.
Decimation on the Two Dimensionnal Ising Model : Non Gibbsianness at Low Temperature. Almost Gibbsianness or Weak Gibbsianness ?
Decomposition in stereological unfolding problems
Degenerate stochastic differential equations for catalytic branching networks
Uniqueness of the martingale problem corresponding to a degenerate SDE which models catalytic branching networks is proven. This work is an extension of the paper by Dawson and Perkins [Illinois J. Math.50 (2006) 323–383] to arbitrary catalytic branching networks. As part of the proof estimates on the corresponding semigroup are found in terms of weighted Hölder norms for arbitrary networks, which are proven to be equivalent to the semigroup norm for this generalized setting.
Delay analysis of an priority queueing system with push-out scheme.
Density fluctuations for a zero-range process on the percolation cluster.
Depinning of a polymer in a multi-interface medium.
Derrida's generalized random energy models 2 : models with continuous hierarchies
Descriptors for point processes based on runs: The Markovian arrival process.
Detecting a local perturbation in a continuous scenery.
Detecting Changes in a Multivariate Renewal Process.
Determinantal transition kernels for some interacting particles on the line
We find the transition kernels for four markovian interacting particle systems on the line, by proving that each of these kernels is intertwined with a Karlin–McGregor-type kernel. The resulting kernels all inherit the determinantal structure from the Karlin–McGregor formula, and have a similar form to Schütz’s kernel for the totally asymmetric simple exclusion process.
Die gemischte Warteordnung in Bedienungssystemen mit beschränktem Warteraum
Die kostenminimale Belastung offener Wartesysteme mit Poisson-Input der Forderungen
Die Polynome von Yang-Lee und ihre Nullstellen.
Differential operators and spectral distributions of invariant ensembles from the classical orthogonal polynomials: the discrete case.
Diffusion and scattering of shocks in the partially asymmetric simple exclusion process.
Diffusion approximation for a controlled service system
Diffusion approximation for first overflow time in system with finite capacity.