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The Multicommodity-Ring Location Routing Problem

The multicommodity-ring location routing problem (MRLRP) studied in this paper is an NP-hard minimization problem arising in city logistics. The aim is to locate a set of urban distribution centers (UDCs) and to connect them via a ring in which massive flows of goods will circulate. Goods are transp...

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Published in:	Transportation science 2016-05, Vol.50 (2), p.541-558
Main Authors:	Gianessi, Paolo, Alfandari, Laurent, Létocart, Lucas, Calvo, Roberto Wolfler
Format:	Article
Language:	English
Subjects:	Analysis city logistics Combinatorial optimization Commodities Computer Science Customers Delivery services Discrete Mathematics Distribution centers Economic aspects Electric vehicles Gates Installation Installation costs Logistics Logistics services Management matheuristics Minimization mixed-integer programming Operating costs Operations Research Parking Route planning Routing Special Issue: Freight Transportation and Logistics Transport costs Transportation Urban transportation Vans
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creator	Gianessi, Paolo Alfandari, Laurent Létocart, Lucas Calvo, Roberto Wolfler
description	The multicommodity-ring location routing problem (MRLRP) studied in this paper is an NP-hard minimization problem arising in city logistics. The aim is to locate a set of urban distribution centers (UDCs) and to connect them via a ring in which massive flows of goods will circulate. Goods are transported from gates located outside the city to a UDC, and either join a second UDC through the ring before being delivered in electric vans to the final customers or are delivered directly to the customers from the first UDC. The reverse trip with pickup and transportation to the gates is also possible. A delivery service path starts at a particular UDC, then visits a subset of customers and ends at the same UDC, another UDC, or a self-service parking lot (SPL). A pickup route can start from an SPL or a UDC and ends at a UDC. The objective is to minimize the sum of the installation costs of the ring, flow transportation costs, and routing costs. The MRLRP belongs to the class of location-routing problems (LRP). We model it with a set-partitioning-like representation of delivery and pickup trips and arc-flow elements to describe goods transportation in the ring and between the ring and the gates. We present three approaches to solving the MRLRP: an exact method for small-size instances, a matheuristic for instances of a larger size, and a hybrid approach that applies the exact method to the columns output by the matheuristic. Numerical results are provided for an exhaustive set of instances, obtained by extending benchmark instances of the capacitated LRP with additional MRLRP features.
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We model it with a set-partitioning-like representation of delivery and pickup trips and arc-flow elements to describe goods transportation in the ring and between the ring and the gates. We present three approaches to solving the MRLRP: an exact method for small-size instances, a matheuristic for instances of a larger size, and a hybrid approach that applies the exact method to the columns output by the matheuristic. Numerical results are provided for an exhaustive set of instances, obtained by extending benchmark instances of the capacitated LRP with additional MRLRP features.</description><subject>Analysis</subject><subject>city logistics</subject><subject>Combinatorial optimization</subject><subject>Commodities</subject><subject>Computer Science</subject><subject>Customers</subject><subject>Delivery services</subject><subject>Discrete Mathematics</subject><subject>Distribution centers</subject><subject>Economic aspects</subject><subject>Electric vehicles</subject><subject>Gates</subject><subject>Installation</subject><subject>Installation costs</subject><subject>Logistics</subject><subject>Logistics services</subject><subject>Management</subject><subject>matheuristics</subject><subject>Minimization</subject><subject>mixed-integer programming</subject><subject>Operating costs</subject><subject>Operations Research</subject><subject>Parking</subject><subject>Route planning</subject><subject>Routing</subject><subject>Special Issue: Freight Transportation and Logistics</subject><subject>Transport costs</subject><subject>Transportation</subject><subject>Urban transportation</subject><subject>Vans</subject><issn>0041-1655</issn><issn>1526-5447</issn><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>2016</creationdate><recordtype>article</recordtype><sourceid>8BJ</sourceid><recordid>eNqFkt1r2zAUxcXYYFm3170VAoXCYM509WXlMZR1HaRslO5ZKLLkKNhWK8lj_e8rk1ESCBSBBIffuVwdDkKfAS-AyPpbjsksCAa-wALjN2gGnIiKM1a_RTOMGVQgOH-PPqS0wwWrgc8Qvt_a-e3YZW9C34fG56fqzg_tfB2Mzj4M87sw5kn4HcOms_1H9M7pLtlP_98z9Of6-_3VTbX-9ePn1WpdGS54rprGOiBQYy2tXnLBLCOykY4b4phwogEg2DghNqAZUMMkkbIRZANYLxvM6Rn6sp-71Z16iL7X8UkF7dXNaq0mDVPOGa3lXyjsxZ59iOFxtCmrXRjjUNZTRNQScA3sgGp1Z5UfXMhRm94no1aM0yXUlE5UdYJq7WCj7sJgnS_yEb84wZfT2L5kespweWQoTLb_cqvHlNQx-PUA3IzJDzaVK_l2m9OeP7WIiSGlaN1LaoDVVBA1FURNBVFTQYrhfG_YpRziC83oElMiD5KYPhX79Nq8Z5KowTE</recordid><startdate>20160501</startdate><enddate>20160501</enddate><creator>Gianessi, Paolo</creator><creator>Alfandari, Laurent</creator><creator>Létocart, Lucas</creator><creator>Calvo, Roberto Wolfler</creator><general>INFORMS</general><general>Transportation Science & Logistic Society of the Institute for Operations Research and Management Sciences</general><general>Institute for Operations Research and the Management Sciences</general><scope>AAYXX</scope><scope>CITATION</scope><scope>N95</scope><scope>XI7</scope><scope>8BJ</scope><scope>FQK</scope><scope>JBE</scope><scope>1XC</scope><orcidid>https://orcid.org/0000-0002-5459-5797</orcidid><orcidid>https://orcid.org/0000-0001-6751-3650</orcidid></search><sort><creationdate>20160501</creationdate><title>The Multicommodity-Ring Location Routing Problem</title><author>Gianessi, Paolo ; 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We model it with a set-partitioning-like representation of delivery and pickup trips and arc-flow elements to describe goods transportation in the ring and between the ring and the gates. We present three approaches to solving the MRLRP: an exact method for small-size instances, a matheuristic for instances of a larger size, and a hybrid approach that applies the exact method to the columns output by the matheuristic. Numerical results are provided for an exhaustive set of instances, obtained by extending benchmark instances of the capacitated LRP with additional MRLRP features.</abstract><cop>Baltimore</cop><pub>INFORMS</pub><doi>10.1287/trsc.2015.0600</doi><tpages>18</tpages><orcidid>https://orcid.org/0000-0002-5459-5797</orcidid><orcidid>https://orcid.org/0000-0001-6751-3650</orcidid></addata></record>
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source	International Bibliography of the Social Sciences (IBSS); Business Source Ultimate【Trial: -2024/12/31】【Remote access available】; JSTOR Archival Journals and Primary Sources Collection
subjects	Analysis city logistics Combinatorial optimization Commodities Computer Science Customers Delivery services Discrete Mathematics Distribution centers Economic aspects Electric vehicles Gates Installation Installation costs Logistics Logistics services Management matheuristics Minimization mixed-integer programming Operating costs Operations Research Parking Route planning Routing Special Issue: Freight Transportation and Logistics Transport costs Transportation Urban transportation Vans
title	The Multicommodity-Ring Location Routing Problem
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