Geodesic
A quantitative study of pure parallel processes
O. Bodini1 ; A. Genitrini2 ; F. Peschanski2
1Université Paris Nord
2Université Pierre et Marie Curie - Paris
The electronic journal of combinatorics, Tome 23 (2016) no. 1
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In this paper, we study the interleaving – or pure merge – operator that most often characterizes parallelism in concurrency theory. This operator is a principal cause of the so-called combinatorial explosion that makes the analysis of process behaviours e.g. by model-checking, very hard – at least from the point of view of computational complexity. The originality of our approach is to study this combinatorial explosion phenomenon on average, relying on advanced analytic combinatorics techniques. We study various measures that contribute to a better understanding of the process behaviours represented as plane rooted trees: the number of runs (corresponding to the width of the trees), the expected total size of the trees as well as their overall shape. Two practical outcomes of our quantitative study are also presented: (1) a linear-time algorithm to compute the probability of a concurrent run prefix, and (2) an efficient algorithm for uniform random sampling of concurrent runs. These provide interesting responses to the combinatorial explosion problem.
DOI : 10.37236/3977
Classification : 05C05, 05A16, 06A07, 68N19
Mots-clés : pure merge, interleaving semantics, concurrency theory, analytic combinatorics, increasing trees, holonomic functions, random generation

O. Bodini  1   ; A. Genitrini  2   ; F. Peschanski  2

1 Université Paris Nord
2 Université Pierre et Marie Curie - Paris 
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O. Bodini; A. Genitrini; F. Peschanski. A quantitative study of pure parallel processes. The electronic journal of combinatorics, Tome 23 (2016) no. 1. doi: 10.37236/3977

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