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Fragmentation at height associated to L\'{e}vy processes
We consider the height process of a L\'{e}vy process with no negative jumps,
and its associated continuous tree representation. Using tools developed by
Duquesne and Le Gall, we construct a fragmentation process at height, which
generalizes the fragmentation at height of stable trees given by Miermont. In
this more general framework, we recover that the dislocation measures are the
same as the dislocation measures of the fragmentation at node introduced by
Abraham and Delmas, up to a factor equal to the fragment size. We also compute
the asymptotic for the number of small fragments
Asymptotically Optimal Algorithms for Pickup and Delivery Problems with Application to Large-Scale Transportation Systems
The Stacker Crane Problem is NP-Hard and the best known approximation
algorithm only provides a 9/5 approximation ratio. The objective of this paper
is threefold. First, by embedding the problem within a stochastic framework, we
present a novel algorithm for the SCP that: (i) is asymptotically optimal,
i.e., it produces, almost surely, a solution approaching the optimal one as the
number of pickups/deliveries goes to infinity; and (ii) has computational
complexity O(n^{2+\eps}), where is the number of pickup/delivery pairs
and \eps is an arbitrarily small positive constant. Second, we asymptotically
characterize the length of the optimal SCP tour. Finally, we study a dynamic
version of the SCP, whereby pickup and delivery requests arrive according to a
Poisson process, and which serves as a model for large-scale demand-responsive
transport (DRT) systems. For such a dynamic counterpart of the SCP, we derive a
necessary and sufficient condition for the existence of stable vehicle routing
policies, which depends only on the workspace geometry, the stochastic
distributions of pickup and delivery points, the arrival rate of requests, and
the number of vehicles. Our results leverage a novel connection between the
Euclidean Bipartite Matching Problem and the theory of random permutations,
and, for the dynamic setting, exhibit novel features that are absent in
traditional spatially-distributed queueing systems.Comment: 27 pages, plus Appendix, 7 figures, extended version of paper being
submitted to IEEE Transactions of Automatic Contro
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