English

Functional equations as an important analytic method in stochastic modelling and in combinatorics

Probability 2017-12-07 v1

Abstract

Functional equations (FE) arise quite naturally in the analysis of stochastic systems of different kinds : queueing and telecommunication networks, random walks, enumeration of planar lattice walks, etc. Frequently, the object is to determine the probability generating function of some positive random vector in Z_n+Z\_n^+. Although the situation n = 1 is more classical, we quote an interesting non local functional equation which appeared in modelling a divide and conquer protocol for a muti-access broadcast channel. As for n = 2, we outline the theory reducing these linear FEs to boundary value problems of Riemann-Hilbert-Carleman type, with closed form integral solutions. Typical queueing examples analyzed over the last 45 years are sketched. Furthermore, it is also sometimes possible to determine the nature of the functions (e.g., rational, algebraic, holonomic), as illustrated in a combinatorial context, where asymptotics are briefly tackled. For general situations (e.g., big jumps, or n \ge 3), only prospective comments are made, because then no concrete theory exists.

Keywords

Cite

@article{arxiv.1712.02271,
  title  = {Functional equations as an important analytic method in stochastic modelling and in combinatorics},
  author = {Guy Fayolle},
  journal= {arXiv preprint arXiv:1712.02271},
  year   = {2017}
}

Comments

To appear in MPRF (Markov Processes and Related Fields), ACMPT-2017, Oct 2017, Moscou, Russia. 2017, Analytic and Computational Methods in Probability Theory and its Applications

R2 v1 2026-06-22T23:10:02.010Z