A Column Generation Based Heuristic for the Multicommodity-ring Vehicle Routing Problem

AbstractWe study a new routing problem arising in City Logistics. Given a ring connecting a set of urban distribution centers (UDCs) in the outskirts of a city, the problem consists in delivering goods from virtual gates located outside the city to the customers inside of it. Goods are transported from a gate to a UDC, then either go to another UDC before being delivered to customers or are directly shipped from the first UDC. The reverse process occurs for pick-up. Routes are performed by electric vans and may be open. The objective is to find a set of routes that visit each customer and to determine ring and gates-UDC flows so that the total transportation and routing cost is minimized. We solve this problem using a column generation-based heuristic, which is tested over a set of benchmark instances issued from a more strategic location-routing problem

The Robust Network Loading Problem under Hose Demand Uncertainty: Formulation, Polyhedral Analysis, and Computations

Cataloged from PDF version of article.We consider the network loading problem (NLP) under a polyhedral uncertainty description of traffic demands. After giving a compact multicommodity flow formulation of the problem, we state a decomposition property obtained from projecting out the flow variables. This property considerably simplifies the resulting polyhedral analysis and computations by doing away with metric inequalities. Then we focus on a specific choice of the uncertainty description, called the “hose model,” which specifies aggregate traffic upper bounds for selected endpoints of the network. We study the polyhedral aspects of the NLP under hose demand uncertainty and use the results as the basis of an efficient branch-and-cut algorithm. The results of extensive computational experiments on well-known network design instances are reported

COMPACT FORMULATION OF MULTICOMMODITY NETWORK FLOWS WITH APPLICATIONS TO THE BACKHAUL PROFIT MAXIMIZATION PROBLEM AND FIXED CHARGE NETWORK FLOW PROBLEM

The triples formulation is a compact formulation of multicommodity network flow problems that provides a different representation of flow than the traditional and widely used node-arc and arc-path approaches. In the literature, the triples formulation has been applied successfully to the maximum concurrent flow problem and to a network optimization problem with piecewise linear convex costs. This dissertation applies the triples formulation to the backhaul profit maximization problem (BPMP) and the fixed charge network flow problem (FCNF). It is shown that the triples representation of multicommodity flow significantly reduces the number of variables and constraints in the mixed integer programming formulations of the BPMP and FCNF. For the BPMP, this results in significantly faster solution times. For dense problem instances, the triples-based formulation of FCNF is found to produce better solutions than the node-arc formulation early in the branch-and-bound process. This observation leads to an effective hybrid method which combines the respective advantages of the smaller size of the triples formulation and the stronger linear programming relaxation of the node-arc formulation. In addition to empirical studies, the dissertation presents new theoretical results supporting the equivalence of the triples formulation to the node-arc and arc-path formulations. The dissertation also proposes a multi-criteria Composite Index Method (CIM) to compare the performance of alternative integer programming formulations of an optimization problem. Using the CIM, the decision maker assigns weights to problem instance sizes and multiple performance measures based on their relative importance for the given application. The weighting scheme is used to produce a single number that measures the relative improvement of one alternative over the other and provides a method to select the most effective approach when neither one dominates the other when tested on different sizes of problem instances. The dissertation demonstrates a successful application of the CIM to evaluate a series of eleven techniques for improving the node-arc and triples formulations of the BPMP previously proposed in the literature

Multi-attribute deterministic and stochastic two echelon location routing problems

Les problèmes de localisation-routage à deux échelons (2E-LRP) sont devenus un domaine de recherche important dans le domaine de la logistique et de la gestion de la chaîne d'approvisionnement. Le 2E-LRP représente un problème d'optimisation dans les systèmes de distribution non dirigés, visant à organiser le transport de marchandises entre les plateformes et les clients par le biais d'installations intermédiaires appelées satellites. Ce problème implique de prendre des décisions simultanées concernant l'emplacement d'un ou deux niveaux d'installations (plateformes et/ou satellites) et de créer un ensemble limité d'itinéraires aux deux échelons afin de répondre efficacement à toutes les demandes des clients. Récemment, la communauté scientifique s'est intéressée de plus en plus à l'étude et à la résolution de problèmes plus réalistes. Cet intérêt provient de la reconnaissance du fait que les systèmes de distribution du monde réel sont caractérisés par une multitude de complexités et d'incertitudes qui ont un impact significatif sur l'efficacité opérationnelle, la rentabilité et la satisfaction des clients. Les chercheurs ont reconnu la nécessité d'aborder ces complexités et incertitudes pour développer des solutions pratiques et efficaces. Cette thèse comprend trois études différentes, chacune correspondant à un article de recherche autonome. Dans les trois articles, nous nous concentrons sur différents 2E-LRP riches qui comprennent plusieurs attributs en interaction. Ces variantes du problème sont appelées problèmes de localisation-routage à deux échelons et à attributs multiples (2E-MALRP). Pour analyser l'influence des incertitudes sur les solutions optimales et les processus de prise de décision, nous considérons à la fois les perspectives déterministes et stochastiques. Cette approche nous permet de mieux comprendre le comportement de ces problèmes complexes. Le premier document de recherche abordé dans cette thèse se concentre sur un problème de localisation-routage déterministe à deux échelons et à attributs multiples avec synchronisation de la flotte dans les installations intermédiaires (2E-MALRPS). Le cadre du problème comprend divers facteurs, notamment la demande de marchandises multiples dépendant du temps, les fenêtres temporelles, le manque de capacité de stockage dans les installations intermédiaires et la nécessité de synchroniser les flottes opérant à différents échelons. Dans le 2E-MALRPS, tous les paramètres, tels que les demandes des clients, les temps de trajet et les coûts, sont connus avec certitude. Dans cet article, nous introduisons le cadre du problème, présentons une formulation de programmation en nombres entiers mixtes et proposons un cadre de découverte de discrétisation dynamique comme méthode de résolution du problème. Le deuxième article de cette thèse traite du problème de localisation-routage à deux échelons en cas de demandes stochastiques et corrélées (2E-MLRPSCD). Contrairement au 2E-MALRPS, le 2E-MLRPSCD prend en compte les incertitudes liées aux demandes des clients, ainsi que la corrélation entre ces demandes. Nous formulons le problème sous la forme d'un modèle de programmation stochastique en deux étapes. Au cours de la première étape, des décisions sont prises concernant la conception des installations satellites, tandis qu'au cours de la deuxième étape, des décisions de recours déterminent la manière dont les demandes observées sont servies. Nous proposons une métaheuristique de couverture progressive comme méthode de résolution. Dans cette approche, nous incorporons deux structures de population dans le cadre de la couverture progressive. Ces structures renforcent la diversité des décisions de conception obtenues pour chaque sous-problème de scénario et fournissent des informations pertinentes pour améliorer la qualité de la solution. En outre, nous introduisons et comparons trois nouvelles stratégies différentes pour accélérer la recherche de l'espace de solution pour le problème stochastique. Finalement, le troisième article présenté dans cette thèse se concentre sur un problème de localisation-routage multi-attributs à deux échelons avec des temps de trajet stochastiques (2E-MALRPSTT). Le 2E-MALRPSTT combine un problème multi-attributs riche avec des éléments stochastiques, en particulier en considérant des temps de trajet stochastiques. Pour traiter le problème stochastique complet, un cadre de couverture progressive (PH) est proposé en s'appuyant sur les lignes directrices méthodologiques définies dans notre deuxième article pour le 2E-MLRPSCD. En outre, une heuristique basée sur la décomposition est introduite pour accélérer le cadre PH, et deux nouvelles stratégies d'agrégation sont présentées pour accélérer le processus de consensus concernant les décisions de la première étape. Les contributions présentées dans cette thèse couvrent divers aspects de la modélisation et des méthodologies de solution pour les 2E-MALRP riches, à la fois d'un point de vue déterministe et d'un point de vue stochastique. Les trois articles inclus dans cette thèse démontrent l'efficacité des approches proposées à travers des campagnes expérimentales étendues, mettant en évidence leur efficacité de calcul et la qualité des solutions, en particulier dans les cas difficiles. En abordant les aspects déterministes et stochastiques de ces 2E-MALRP, cette thèse vise à contribuer à l'ensemble des connaissances en optimisation de la logistique et de la chaîne d'approvisionnement, à répondre aux besoins importants de la littérature actuelle et à fournir des informations importantes pour les systèmes de distribution à deux échelons dans divers contextes.The Two-Echelon Location-Routing Problems (2E-LRPs) have emerged as a prominent research area within the field of logistics and supply chain management. The 2E-LRP represents an optimization problem in undirected distribution systems, aiming to streamline freight transportation between platforms and customers through intermediate facilities known as satellites. This problem involves making simultaneous decisions concerning the location of one or two levels of facilities (platforms and/or satellites) and creating a limited set of routes at both echelons to effectively serve all customer demands. In recent years, there has been a growing interest among the scientific community in studying and solving more realistic problem settings. This interest arises from the recognition that real-world distribution systems are characterized by a multitude of complexities and uncertainties that significantly impact operational efficiency, cost-effectiveness, and customer satisfaction. Researchers have acknowledged the need to address these complexities and uncertainties to develop practical and effective solutions. This dissertation comprises three distinct studies, each serving as a self-contained research article. In all three articles, we focus on different rich 2E-LRPs that encompass multiple interacting attributes. These problem variants are referred to as two-echelon multi-attribute location-routing problems (2E-MALRPs). To analyze the influence of uncertainties on optimal solutions and decision-making processes, we consider both deterministic and stochastic perspectives. This approach allows us to gain insights into the behavior of these complex problem settings. The first research paper addressed in this thesis focuses on a deterministic two-echelon multi-attribute location-routing problem with fleet synchronization at intermediate facilities (2E-MALRPS). The problem setting encompasses various factors, including time-dependent multicommodity demand, time windows, lack of storage capacity at intermediate facilities, and the need for synchronization of fleets operating at different echelons. In the 2E-MALRPS, all parameters, such as customer demands, travel times, and costs, are known with certainty. In this paper, we introduce the problem setting, present a mixed-integer programming formulation, and propose a dynamic discretization discovery framework as the solution method to address the problem. The second paper in this thesis addresses the two-echelon multicommodity location-routing problem with stochastic and correlated demands (2E-MLRPSCD). In contrast to the 2E-MALRPS, the 2E-MLRPSCD takes into account uncertainties related to customer demands, as well as the correlation among these demands. We formulate the problem as a two-stage stochastic programming model. In the first stage, decisions are made regarding the design of satellite facilities, while in the second stage, recourse decisions determine how the observed demands are allocated and served. We propose a progressive hedging metaheuristic as the solution method. In this approach, we incorporate two population structures within the progressive hedging framework. These structures enhance the diversity of the design decisions obtained for each scenario subproblem and provide valuable insights for improving the solution quality. Additionally, We also introduce and compare three different novel strategies to accelerate the search for the solution space for the stochastic problem. Finally, the third paper presented in this thesis focuses on a multi-attribute two-echelon location-routing problem with stochastic travel times (2E-MALRPSTT). The 2E-MALRPSTT combines a rich multi-attribute problem setting with stochastic elements, specifically considering stochastic travel times. To address the complete stochastic problem, a progressive hedging metaheuristic is proposed building on the methodological guidelines defined in our second paper for the 2E-MLRPSCD. Furthermore, a decomposition-based heuristic is introduced to accelerate the PH framework, and two novel selection strategies are presented to expedite the consensus process regarding the first-stage decisions. The contributions presented in this thesis encompass various aspects of modeling and solution methodologies for rich 2E-MALRPs from both deterministic and stochastic perspectives. The three articles included in this thesis demonstrate the effectiveness of the proposed approaches through extensive experimental campaigns, highlighting their computational efficiency and solution quality, particularly in challenging instances. By addressing the deterministic and stochastic aspects of these 2E-MALRPs, this thesis aims to contribute to the broader body of knowledge in logistics and supply chain optimization, fill important gaps in the present literature and provide valuable insights for two-echelon distribution systems in diverse settings

Analysis of adaptive algorithms for an integrated communication network

Techniques were examined that trade communication bandwidth for decreased transmission delays. When the network is lightly used, these schemes attempt to use additional network resources to decrease communication delays. As the network utilization rises, the schemes degrade gracefully, still providing service but with minimal use of the network. Because the schemes use a combination of circuit and packet switching, they should respond to variations in the types and amounts of network traffic. Also, a combination of circuit and packet switching to support the widely varying traffic demands imposed on an integrated network was investigated. The packet switched component is best suited to bursty traffic where some delays in delivery are acceptable. The circuit switched component is reserved for traffic that must meet real time constraints. Selected packet routing algorithms that might be used in an integrated network were simulated. An integrated traffic places widely varying workload demands on a network. Adaptive algorithms were identified, ones that respond to both the transient and evolutionary changes that arise in integrated networks. A new algorithm was developed, hybrid weighted routing, that adapts to workload changes

Merlin: A Language for Provisioning Network Resources

This paper presents Merlin, a new framework for managing resources in software-defined networks. With Merlin, administrators express high-level policies using programs in a declarative language. The language includes logical predicates to identify sets of packets, regular expressions to encode forwarding paths, and arithmetic formulas to specify bandwidth constraints. The Merlin compiler uses a combination of advanced techniques to translate these policies into code that can be executed on network elements including a constraint solver that allocates bandwidth using parameterizable heuristics. To facilitate dynamic adaptation, Merlin provides mechanisms for delegating control of sub-policies and for verifying that modifications made to sub-policies do not violate global constraints. Experiments demonstrate the expressiveness and scalability of Merlin on real-world topologies and applications. Overall, Merlin simplifies network administration by providing high-level abstractions for specifying network policies and scalable infrastructure for enforcing them