On Dirichlet eigenvectors for neutral two-dimensional Markov chains

We include in particular a reminder of the useful definitions and properties of Markov chains on a general state space (see Section A ), and the presentation of two

Although one need not take any position on quantum gravity to find interest in the Discrete Action as a random variable defined for a continuum spacetime – one need not consider

the open channels coupled to the 10 beam by the first, second, and third shortest reciprocal lattice vectors. As far as the 01 (10) beam is concemed the calcu-

We compared the ACCPM decomposition method, involving a policy improvement algorithm at the oracle level, with a direct LP method to solve the limit control problem.. We observed (i)

We prove a new concentration inequality for U-statistics of order two for uniformly ergodic Markov chains. Working with bounded π -canonical kernels, we show that we can recover

The aim of this paper is to explore potentially fruitful links between the Random Matrix and the Markov Chains literature, by studying the spectrum of reversible Markov chains

We show that the solution of the two-dimensional Dirichlet problem set in a plane do- main is the limit of the solutions of similar problems set on a sequence of

existence and shape of the invariant measure, time-reversal, return time to the origin, contact probability at the origin, extinction probability, height and length of the excursions,