Polynomial Time Approximation Scheme for the Minimum-weight k-Size Cycle Cover Problem in Euclidean space of an arbitrary fixed dimension

Khachay, M.; Neznakhina, K.

doi:10.1016/j.ifacol.2016.07.541

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Поле DC	Значение	Язык
dc.contributor.author	Khachay, M.	en
dc.contributor.author	Neznakhina, K.	en
dc.date.accessioned	2020-10-20T16:37:00Z	-
dc.date.available	2020-10-20T16:37:00Z	-
dc.date.issued	2016	-
dc.identifier.citation	Khachay M. Polynomial Time Approximation Scheme for the Minimum-weight k-Size Cycle Cover Problem in Euclidean space of an arbitrary fixed dimension / M. Khachay, K. Neznakhina. — DOI 10.1016/j.ifacol.2016.07.541 // IFAC-PapersOnLine. — 2016. — Vol. 12. — Iss. 49. — P. 6-10.	en
dc.identifier.issn	2405-8963	-
dc.identifier.other	https://doi.org/10.1016/j.ifacol.2016.07.541	pdf
dc.identifier.other	1	good_DOI
dc.identifier.other	ba01ee64-42e2-4277-8f1f-1cf5911c9f8c	pure_uuid
dc.identifier.other	http://www.scopus.com/inward/record.url?partnerID=8YFLogxK&scp=84992374825	m
dc.identifier.uri	http://elar.urfu.ru/handle/10995/92743	-
dc.description.abstract	We study the Min-k-SCCP on the partition of a complete weighted digraph by k vertex-disjoint cycles of minimum total weight. This problem is the generalization of the well-known traveling salesman problem (TSP) and the special case of the classical vehicle routing problem (VRP). It is known that the problem Min-k-SCCP is strongly NP-hard and remains intractable even in the geometric statement. For the Euclidean Min-k-SCCP in Rd, we construct a polynomial-time approximation scheme, which generalizes the approach proposed earlier for the planar Min-2-SCCP. For any fixed c > 1, the scheme finds a (1 + 1/c)-approximate solution in time of O(nd+1(k log n)(O (√dc))d-1 2k). © 2016	en
dc.format.mimetype	application/pdf	en
dc.language.iso	en	en
dc.publisher	Elsevier B.V.	en
dc.rights	info:eu-repo/semantics/openAccess	en
dc.source	IFAC-PapersOnLine	en
dc.subject	CYCLE COVER OF SIZE K	en
dc.subject	NP-HARD PROBLEM	en
dc.subject	POLYNOMIAL-TIME APPROXIMATION SCHEME (PTAS)	en
dc.subject	TRAVELING SALESMAN PROBLEM (TSP)	en
dc.subject	APPROXIMATION THEORY	en
dc.subject	COMPUTATIONAL COMPLEXITY	en
dc.subject	POLYNOMIAL APPROXIMATION	en
dc.subject	POLYNOMIALS	en
dc.subject	VEHICLE ROUTING	en
dc.subject	APPROXIMATE SOLUTION	en
dc.subject	CYCLE COVERS	en
dc.subject	MINIMUM TOTAL WEIGHTS	en
dc.subject	POLYNOMIAL TIME APPROXIMATION SCHEMES	en
dc.subject	STRONGLY NP-HARD	en
dc.subject	VEHICLE ROUTING PROBLEM	en
dc.subject	VERTEX-DISJOINT CYCLES	en
dc.subject	WEIGHTED DIGRAPH	en
dc.subject	TRAVELING SALESMAN PROBLEM	en
dc.title	Polynomial Time Approximation Scheme for the Minimum-weight k-Size Cycle Cover Problem in Euclidean space of an arbitrary fixed dimension	en
dc.type	Article	en
dc.type	info:eu-repo/semantics/article	en
dc.type	info:eu-repo/semantics/publishedVersion	en
dc.identifier.doi	10.1016/j.ifacol.2016.07.541	-
dc.identifier.scopus	84992374825	-
local.affiliation	Krasovsky Institute of Mathematics and Mechanics, Ural Federal University, 16 S.Kovalevskoy str., Ekaterinburg, 620990, Russian Federation
local.affiliation	Omsk State Technical University, 11 Mira ave., Omsk, 644055, Russian Federation
local.contributor.employee	Khachay, M., Krasovsky Institute of Mathematics and Mechanics, Ural Federal University, 16 S.Kovalevskoy str., Ekaterinburg, 620990, Russian Federation, Omsk State Technical University, 11 Mira ave., Omsk, 644055, Russian Federation
local.contributor.employee	Neznakhina, K., Krasovsky Institute of Mathematics and Mechanics, Ural Federal University, 16 S.Kovalevskoy str., Ekaterinburg, 620990, Russian Federation
local.description.firstpage	6	-
local.description.lastpage	10	-
local.issue	49	-
local.volume	12	-
dc.identifier.wos	000383468400003	-
local.identifier.pure	1189469	-
local.identifier.eid	2-s2.0-84992374825	-
local.identifier.wos	WOS:000383468400003	-
Располагается в коллекциях:	Научные публикации ученых УрФУ, проиндексированные в SCOPUS и WoS CC

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