Max-Min Problems of Searching for Two Disjoint Subsets › Обзор исследований

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Max-Min Problems of Searching for Two Disjoint Subsets. / Khandeev, Vladimir; Neshchadim, Sergey.

Optimization and Applications - 12th International Conference, OPTIMA 2021, Proceedings. ред. / Nicholas N. Olenev; Yuri G. Evtushenko; Milojica Jaćimović; Michael Khachay; Vlasta Malkova. Springer Science and Business Media Deutschland GmbH, 2021. стр. 231-245 (Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics); Том 13078 LNCS).

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

Harvard

Khandeev, V & Neshchadim, S 2021, Max-Min Problems of Searching for Two Disjoint Subsets. в NN Olenev, YG Evtushenko, M Jaćimović, M Khachay & V Malkova (ред.), Optimization and Applications - 12th International Conference, OPTIMA 2021, Proceedings. Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics), Том. 13078 LNCS, Springer Science and Business Media Deutschland GmbH, стр. 231-245, 12th International Conference on Optimization and Applications, OPTIMA 2021, Virtual, Online, 27.09.2021. https://doi.org/10.1007/978-3-030-91059-4_17

APA

Khandeev, V., & Neshchadim, S. (2021). Max-Min Problems of Searching for Two Disjoint Subsets. в N. N. Olenev, Y. G. Evtushenko, M. Jaćimović, M. Khachay, & V. Malkova (Ред.), Optimization and Applications - 12th International Conference, OPTIMA 2021, Proceedings (стр. 231-245). (Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics); Том 13078 LNCS). Springer Science and Business Media Deutschland GmbH. https://doi.org/10.1007/978-3-030-91059-4_17

Vancouver

Khandeev V, Neshchadim S. Max-Min Problems of Searching for Two Disjoint Subsets. в Olenev NN, Evtushenko YG, Jaćimović M, Khachay M, Malkova V, Редакторы, Optimization and Applications - 12th International Conference, OPTIMA 2021, Proceedings. Springer Science and Business Media Deutschland GmbH. 2021. стр. 231-245. (Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)). doi: 10.1007/978-3-030-91059-4_17

Author

Khandeev, Vladimir ; Neshchadim, Sergey. / Max-Min Problems of Searching for Two Disjoint Subsets. Optimization and Applications - 12th International Conference, OPTIMA 2021, Proceedings. Редактор / Nicholas N. Olenev ; Yuri G. Evtushenko ; Milojica Jaćimović ; Michael Khachay ; Vlasta Malkova. Springer Science and Business Media Deutschland GmbH, 2021. стр. 231-245 (Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)).

BibTeX

@inproceedings{96ce56345bf64b10a4c89828f9f12319,

title = "Max-Min Problems of Searching for Two Disjoint Subsets",

abstract = "The work considers three problems of searching for two disjoint subsets among a finite set of points in Euclidean space. In all three problems, it is required to maximize the minimal size of these subsets so that in each cluster, the total intra-cluster scatter of points relative to the cluster center does not exceed a predetermined threshold. In the first problem, the centers of the clusters are fixed points of Euclidean space and are given as input. In the second one, centers are unknown, but they belong to the initial set. In the last problem, the center of the cluster is the arithmetic mean of all its elements. Earlier works considered problems with constraints on the quadratic intra-cluster scatter. Quadratic analogs of the first two problems were proven to be NP-hard even in the one-dimensional case. For the third analog, the complexity remains unknown. The main result of the work are proofs of NP-hardness of all considered problems even in the one-dimensional case.",

keywords = "Bounded scatter, Clustering, Euclidean space, Max-min problem, NP-hardness",

author = "Vladimir Khandeev and Sergey Neshchadim",

note = "Publisher Copyright: {\textcopyright} 2021, Springer Nature Switzerland AG.; 12th International Conference on Optimization and Applications, OPTIMA 2021 ; Conference date: 27-09-2021 Through 01-10-2021",

year = "2021",

doi = "10.1007/978-3-030-91059-4_17",

language = "English",

isbn = "9783030910587",

series = "Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)",

publisher = "Springer Science and Business Media Deutschland GmbH",

pages = "231--245",

editor = "Olenev, {Nicholas N.} and Evtushenko, {Yuri G.} and Milojica Ja{\'c}imovi{\'c} and Michael Khachay and Vlasta Malkova",

booktitle = "Optimization and Applications - 12th International Conference, OPTIMA 2021, Proceedings",

address = "Germany",

}

RIS

TY - GEN

T1 - Max-Min Problems of Searching for Two Disjoint Subsets

AU - Khandeev, Vladimir

AU - Neshchadim, Sergey

PY - 2021

Y1 - 2021

N2 - The work considers three problems of searching for two disjoint subsets among a finite set of points in Euclidean space. In all three problems, it is required to maximize the minimal size of these subsets so that in each cluster, the total intra-cluster scatter of points relative to the cluster center does not exceed a predetermined threshold. In the first problem, the centers of the clusters are fixed points of Euclidean space and are given as input. In the second one, centers are unknown, but they belong to the initial set. In the last problem, the center of the cluster is the arithmetic mean of all its elements. Earlier works considered problems with constraints on the quadratic intra-cluster scatter. Quadratic analogs of the first two problems were proven to be NP-hard even in the one-dimensional case. For the third analog, the complexity remains unknown. The main result of the work are proofs of NP-hardness of all considered problems even in the one-dimensional case.

AB - The work considers three problems of searching for two disjoint subsets among a finite set of points in Euclidean space. In all three problems, it is required to maximize the minimal size of these subsets so that in each cluster, the total intra-cluster scatter of points relative to the cluster center does not exceed a predetermined threshold. In the first problem, the centers of the clusters are fixed points of Euclidean space and are given as input. In the second one, centers are unknown, but they belong to the initial set. In the last problem, the center of the cluster is the arithmetic mean of all its elements. Earlier works considered problems with constraints on the quadratic intra-cluster scatter. Quadratic analogs of the first two problems were proven to be NP-hard even in the one-dimensional case. For the third analog, the complexity remains unknown. The main result of the work are proofs of NP-hardness of all considered problems even in the one-dimensional case.

KW - Bounded scatter

KW - Clustering

KW - Euclidean space

KW - Max-min problem

KW - NP-hardness

UR - http://www.scopus.com/inward/record.url?scp=85120075368&partnerID=8YFLogxK

UR - https://www.mendeley.com/catalogue/5921a92b-0ed3-33e1-9c18-c841f4c45959/

U2 - 10.1007/978-3-030-91059-4_17

DO - 10.1007/978-3-030-91059-4_17

M3 - Conference contribution

AN - SCOPUS:85120075368

SN - 9783030910587

T3 - Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)

SP - 231

EP - 245

BT - Optimization and Applications - 12th International Conference, OPTIMA 2021, Proceedings

A2 - Olenev, Nicholas N.

A2 - Evtushenko, Yuri G.

A2 - Jaćimović, Milojica

A2 - Khachay, Michael

A2 - Malkova, Vlasta

PB - Springer Science and Business Media Deutschland GmbH

T2 - 12th International Conference on Optimization and Applications, OPTIMA 2021

Y2 - 27 September 2021 through 1 October 2021

ER -

ID: 34865633