On complexity of searching a subset of vectors with shortest average under a cardinality restriction

Standard

On complexity of searching a subset of vectors with shortest average under a cardinality restriction. / Eremeev, Anton V.; Kel’Manov, Alexander V.; Pyatkin, Artem V.

Analysis of Images, Social Networks and Texts - 5th International Conference, AIST 2016, Revised Selected Papers. ред. / DI Ignatov; MY Khachay; VG Labunets; N Loukachevitch; SI Nikolenko; A Panchenko; AV Savchenko; K Vorontsov. Springer-Verlag GmbH and Co. KG, 2017. стр. 51-57 (Communications in Computer and Information Science; Том 661).

Результаты исследований: Публикации в книгах, отчётах, сборниках, трудах конференций › статья в сборнике материалов конференции › научная › Рецензирование

Harvard

Eremeev, AV, Kel’Manov, AV & Pyatkin, AV 2017, On complexity of searching a subset of vectors with shortest average under a cardinality restriction. в DI Ignatov, MY Khachay, VG Labunets, N Loukachevitch, SI Nikolenko, A Panchenko, AV Savchenko & K Vorontsov (ред.), Analysis of Images, Social Networks and Texts - 5th International Conference, AIST 2016, Revised Selected Papers. Communications in Computer and Information Science, Том. 661, Springer-Verlag GmbH and Co. KG, стр. 51-57, 5th International Conference on Analysis of Images, Social Networks and Texts, AIST 2016, Yekaterinburg, Российская Федерация, 06.04.2016. https://doi.org/10.1007/978-3-319-52920-2_5

APA

Eremeev, A. V., Kel’Manov, A. V., & Pyatkin, A. V. (2017). On complexity of searching a subset of vectors with shortest average under a cardinality restriction. в DI. Ignatov, MY. Khachay, VG. Labunets, N. Loukachevitch, SI. Nikolenko, A. Panchenko, AV. Savchenko, & K. Vorontsov (Ред.), Analysis of Images, Social Networks and Texts - 5th International Conference, AIST 2016, Revised Selected Papers (стр. 51-57). (Communications in Computer and Information Science; Том 661). Springer-Verlag GmbH and Co. KG. https://doi.org/10.1007/978-3-319-52920-2_5

Vancouver

Eremeev AV, Kel’Manov AV, Pyatkin AV. On complexity of searching a subset of vectors with shortest average under a cardinality restriction. в Ignatov DI, Khachay MY, Labunets VG, Loukachevitch N, Nikolenko SI, Panchenko A, Savchenko AV, Vorontsov K, Редакторы, Analysis of Images, Social Networks and Texts - 5th International Conference, AIST 2016, Revised Selected Papers. Springer-Verlag GmbH and Co. KG. 2017. стр. 51-57. (Communications in Computer and Information Science). doi: 10.1007/978-3-319-52920-2_5

Author

Eremeev, Anton V. ; Kel’Manov, Alexander V. ; Pyatkin, Artem V. / On complexity of searching a subset of vectors with shortest average under a cardinality restriction. Analysis of Images, Social Networks and Texts - 5th International Conference, AIST 2016, Revised Selected Papers. Редактор / DI Ignatov ; MY Khachay ; VG Labunets ; N Loukachevitch ; SI Nikolenko ; A Panchenko ; AV Savchenko ; K Vorontsov. Springer-Verlag GmbH and Co. KG, 2017. стр. 51-57 (Communications in Computer and Information Science).

BibTeX

@inproceedings{3dc6f0601ac84f1abeeb96c3d86e885c,

title = "On complexity of searching a subset of vectors with shortest average under a cardinality restriction",

abstract = "In this paper, we study the computational complexity of the following subset search problem in a set of vectors. Given a set of N Euclidean q-dimensional vectors and an integer M, choose a subset of at least M vectors minimizing the Euclidean norm of the arithmetic mean of chosen vectors. This problem is induced, in particular, by a problem of clustering a set of points into two clusters where one of the clusters consists of points with a mean close to a given point. Without loss of generality the given point may be assumed to be the origin. We show that the considered problem is NP-hard in the strong sense and it does not admit any approximation algorithm with guaranteed performance, unless P = NP. An exact algorithm with pseudo-polynomial time complexity is proposed for the special case of the problem, where the dimension q of the space is bounded from above by a constant and the input data are integer.",

keywords = "Euclidean norm, NP-hardness, Pseudo-polymonial time, Subset selection, Vectors sum, CLUSTER-ANALYSIS",

author = "Eremeev, {Anton V.} and Kel{\textquoteright}Manov, {Alexander V.} and Pyatkin, {Artem V.}",

year = "2017",

month = jan,

day = "1",

doi = "10.1007/978-3-319-52920-2_5",

language = "English",

isbn = "9783319529196",

series = "Communications in Computer and Information Science",

publisher = "Springer-Verlag GmbH and Co. KG",

pages = "51--57",

editor = "DI Ignatov and MY Khachay and VG Labunets and N Loukachevitch and SI Nikolenko and A Panchenko and AV Savchenko and K Vorontsov",

booktitle = "Analysis of Images, Social Networks and Texts - 5th International Conference, AIST 2016, Revised Selected Papers",

address = "Germany",

note = "5th International Conference on Analysis of Images, Social Networks and Texts, AIST 2016 ; Conference date: 06-04-2016 Through 08-04-2016",

}

RIS

TY - GEN

T1 - On complexity of searching a subset of vectors with shortest average under a cardinality restriction

AU - Eremeev, Anton V.

AU - Kel’Manov, Alexander V.

AU - Pyatkin, Artem V.

PY - 2017/1/1

Y1 - 2017/1/1

N2 - In this paper, we study the computational complexity of the following subset search problem in a set of vectors. Given a set of N Euclidean q-dimensional vectors and an integer M, choose a subset of at least M vectors minimizing the Euclidean norm of the arithmetic mean of chosen vectors. This problem is induced, in particular, by a problem of clustering a set of points into two clusters where one of the clusters consists of points with a mean close to a given point. Without loss of generality the given point may be assumed to be the origin. We show that the considered problem is NP-hard in the strong sense and it does not admit any approximation algorithm with guaranteed performance, unless P = NP. An exact algorithm with pseudo-polynomial time complexity is proposed for the special case of the problem, where the dimension q of the space is bounded from above by a constant and the input data are integer.

AB - In this paper, we study the computational complexity of the following subset search problem in a set of vectors. Given a set of N Euclidean q-dimensional vectors and an integer M, choose a subset of at least M vectors minimizing the Euclidean norm of the arithmetic mean of chosen vectors. This problem is induced, in particular, by a problem of clustering a set of points into two clusters where one of the clusters consists of points with a mean close to a given point. Without loss of generality the given point may be assumed to be the origin. We show that the considered problem is NP-hard in the strong sense and it does not admit any approximation algorithm with guaranteed performance, unless P = NP. An exact algorithm with pseudo-polynomial time complexity is proposed for the special case of the problem, where the dimension q of the space is bounded from above by a constant and the input data are integer.

KW - Euclidean norm

KW - NP-hardness

KW - Pseudo-polymonial time

KW - Subset selection

KW - Vectors sum

KW - CLUSTER-ANALYSIS

UR - http://www.scopus.com/inward/record.url?scp=85014263432&partnerID=8YFLogxK

U2 - 10.1007/978-3-319-52920-2_5

DO - 10.1007/978-3-319-52920-2_5

M3 - Conference contribution

AN - SCOPUS:85014263432

SN - 9783319529196

T3 - Communications in Computer and Information Science

SP - 51

EP - 57

BT - Analysis of Images, Social Networks and Texts - 5th International Conference, AIST 2016, Revised Selected Papers

A2 - Ignatov, DI

A2 - Khachay, MY

A2 - Labunets, VG

A2 - Loukachevitch, N

A2 - Nikolenko, SI

A2 - Panchenko, A

A2 - Savchenko, AV

A2 - Vorontsov, K

PB - Springer-Verlag GmbH and Co. KG

T2 - 5th International Conference on Analysis of Images, Social Networks and Texts, AIST 2016

Y2 - 6 April 2016 through 8 April 2016

ER -

ID: 10278115