AbstractMany probabilistic properties of elementary discrete combinatorial structures of interest for the average-case analysis of algorithms prove to be decidable. This paper presents a general framework in which such decision procedures can be developed. It is based on a combination of generating function techniques for counting, and complex analysis techniques for asymptotic estimations.We expose here the theory of exact analysis in terms of generating functions for four different domains: the iterative/recursive and unlabelled/labelled data type domains. We then present some major components of the associated asymptotic theory and exhibit a class of naturally arising functions that can be automatically analyzed.A fair fragment of this t...
Cette thèse est dédiée à l'étude d'une large classe d'algorithmes, appelés algorithmes en arbre. En ...
AbstractThis paper takes the next step in developing the theory of average case complexity initiated...
AbstractThe class of problems involving the random generation of combinatorial structures from a uni...
AbstractMany probabilistic properties of elementary discrete combinatorial structures of interest fo...
This report is part of a projected series whose aim is to present in a synthetic way the major metho...
this thesis studies systematic methods to determine automatically the average-case cost of an algori...
The average case analysis of algorithms can avail itself of the development of synthetic methods in ...
In a probabilistic context, the main data structures of computer science are viewed as random combin...
This report is part of a projected series whose aim is to present in a synthetic way the major metho...
This booklet develops in nearly 200 pages the basics of combinatorial enumeration through an approac...
We consider the problem of developing automated techniques to aid the average-case complexity analys...
AbstractLevin introduced an average-case complexity measure, based on a notion of “polynomial on ave...
AbstractA systematic approach to the random generation of labelled combinatorial objects is presente...
grantor: University of TorontoThe hardest problems in the complexity class NP are called N...
This expository paper demonstrates how to use Kolmogorov complexity to do the average-case analysis ...
Cette thèse est dédiée à l'étude d'une large classe d'algorithmes, appelés algorithmes en arbre. En ...
AbstractThis paper takes the next step in developing the theory of average case complexity initiated...
AbstractThe class of problems involving the random generation of combinatorial structures from a uni...
AbstractMany probabilistic properties of elementary discrete combinatorial structures of interest fo...
This report is part of a projected series whose aim is to present in a synthetic way the major metho...
this thesis studies systematic methods to determine automatically the average-case cost of an algori...
The average case analysis of algorithms can avail itself of the development of synthetic methods in ...
In a probabilistic context, the main data structures of computer science are viewed as random combin...
This report is part of a projected series whose aim is to present in a synthetic way the major metho...
This booklet develops in nearly 200 pages the basics of combinatorial enumeration through an approac...
We consider the problem of developing automated techniques to aid the average-case complexity analys...
AbstractLevin introduced an average-case complexity measure, based on a notion of “polynomial on ave...
AbstractA systematic approach to the random generation of labelled combinatorial objects is presente...
grantor: University of TorontoThe hardest problems in the complexity class NP are called N...
This expository paper demonstrates how to use Kolmogorov complexity to do the average-case analysis ...
Cette thèse est dédiée à l'étude d'une large classe d'algorithmes, appelés algorithmes en arbre. En ...
AbstractThis paper takes the next step in developing the theory of average case complexity initiated...
AbstractThe class of problems involving the random generation of combinatorial structures from a uni...