Object

Title: On the Hypercube Subset Partitioning Varieties

Co-author(s) :

Aslanyan Levon ; Ryazanov Vladimir

Abstract:

In this paper, the problem of a quantitative description of partitions (QDP) of arbitrary m-subsets of the n-dimensional unit cube is considered for a given m, 0 ≤ m ≤ 2 n . A necessary condition for the existence of a given QDP-subset is achieved in terms of minimal and maximal layers that are known by earlier publications. It is shown that QDP are in a correspondence to the upper homogeneous area elements of the n-cube and to the monotone Boolean functions. The NP-hardness of the QDP problem is proved. QDP singular points on different layers of the cube are described.

Publisher:

IEEE

Identifier:

oai:noad.sci.am:136194

DOI:

10.1109/CSITechnol.2019.8895211

Journal or Publication Title:

2019 Computer Science and Information Technologies (CSIT)

URL:

click here to follow the link

Affiliation:

Institute for Informatics and Automation Problems of NAS RA ; Computer Center of Federal Research Center CSC RAS

Country:

Armenia

Year:

2019

Time period:

23-27 Sept. 2019

Conference title:

2019 Computer Science and Information Technologies (CSIT)

Place:

Yerevan, Armenia

Indexing:

WOS

Object collections:

Last modified:

May 3, 2021

In our library since:

Apr 20, 2021

Number of object content hits:

2

All available object's versions:

https://noad.sci.am/publication/149759

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