On the functions with values in [alpha(G),(chi)over-bar(G)]

Standard

On the functions with values in [alpha(G),(chi)over-bar(G)]. / Dobrynin, Pavel; Pliskin, M; Prosolupov, E.

In: Electronic Journal of Combinatorics, Vol. 11, No. 1, 5, 22.03.2004.

Research output: Contribution to journal › Article › peer-review

Harvard

Dobrynin, P, Pliskin, M & Prosolupov, E 2004, 'On the functions with values in [alpha(G),(chi)over-bar(G)]', Electronic Journal of Combinatorics, vol. 11, no. 1, 5.

APA

Dobrynin, P., Pliskin, M., & Prosolupov, E. (2004). On the functions with values in [alpha(G),(chi)over-bar(G)]. Electronic Journal of Combinatorics, 11(1), [5].

Vancouver

Dobrynin P, Pliskin M, Prosolupov E. On the functions with values in [alpha(G),(chi)over-bar(G)]. Electronic Journal of Combinatorics. 2004 Mar 22;11(1). 5.

Author

Dobrynin, Pavel ; Pliskin, M ; Prosolupov, E. / On the functions with values in [alpha(G),(chi)over-bar(G)]. In: Electronic Journal of Combinatorics. 2004 ; Vol. 11, No. 1.

BibTeX

@article{68685279389a4acfb947dc04e0e71e3c,

title = "On the functions with values in [alpha(G),(chi)over-bar(G)]",

abstract = "LetB(G) = {X : X is an element of R-nxn, X = X-T, I less than or equal to X less than or equal to I + A(G)}andC(G) = {X : X is an element of R-nxn, X = X-T, I - A(G) less than or equal to X less than or equal to I + A(G)}be classes of matrices associated with graph G. Here n is the number of vertices in graph G, and A( G) is the adjacency matrix of this graph. Denote r(G) = min(Xis an element ofc(G)) rank(X), r(+)(G) = min(Xis an element ofB(G)) rank(X). We have shown previously that for every graph G, alpha(G) less than or equal to r(+)(G) less than or equal to (χ) over bar (G) holds and alpha(G) = r(+)(G) implies alpha(G) = (χ) over bar (G). In this article we show that there is a graph G such that alpha(G) = r(G) but alpha(G) <(G). In the case when the graph G doesn't contain two chordless cycles C-4 with a common edge, the equality alpha(G) = r(G) implies alpha(G) = (χ) over bar (G). Corollary: the last statement holds for d(G) - the minimal dimension of the orthonormal representation of the graph G.",

keywords = "CHROMATIC NUMBER, RANK, GRAPH",

author = "Pavel Dobrynin and M Pliskin and E Prosolupov",

year = "2004",

month = mar,

day = "22",

language = "Английский",

volume = "11",

journal = "Electronic Journal of Combinatorics",

issn = "1077-8926",

publisher = "Electronic Journal of Combinatorics",

number = "1",

}

RIS

TY - JOUR

T1 - On the functions with values in [alpha(G),(chi)over-bar(G)]

AU - Dobrynin, Pavel

AU - Pliskin, M

AU - Prosolupov, E

PY - 2004/3/22

Y1 - 2004/3/22

N2 - LetB(G) = {X : X is an element of R-nxn, X = X-T, I less than or equal to X less than or equal to I + A(G)}andC(G) = {X : X is an element of R-nxn, X = X-T, I - A(G) less than or equal to X less than or equal to I + A(G)}be classes of matrices associated with graph G. Here n is the number of vertices in graph G, and A( G) is the adjacency matrix of this graph. Denote r(G) = min(Xis an element ofc(G)) rank(X), r(+)(G) = min(Xis an element ofB(G)) rank(X). We have shown previously that for every graph G, alpha(G) less than or equal to r(+)(G) less than or equal to (χ) over bar (G) holds and alpha(G) = r(+)(G) implies alpha(G) = (χ) over bar (G). In this article we show that there is a graph G such that alpha(G) = r(G) but alpha(G) <(G). In the case when the graph G doesn't contain two chordless cycles C-4 with a common edge, the equality alpha(G) = r(G) implies alpha(G) = (χ) over bar (G). Corollary: the last statement holds for d(G) - the minimal dimension of the orthonormal representation of the graph G.

AB - LetB(G) = {X : X is an element of R-nxn, X = X-T, I less than or equal to X less than or equal to I + A(G)}andC(G) = {X : X is an element of R-nxn, X = X-T, I - A(G) less than or equal to X less than or equal to I + A(G)}be classes of matrices associated with graph G. Here n is the number of vertices in graph G, and A( G) is the adjacency matrix of this graph. Denote r(G) = min(Xis an element ofc(G)) rank(X), r(+)(G) = min(Xis an element ofB(G)) rank(X). We have shown previously that for every graph G, alpha(G) less than or equal to r(+)(G) less than or equal to (χ) over bar (G) holds and alpha(G) = r(+)(G) implies alpha(G) = (χ) over bar (G). In this article we show that there is a graph G such that alpha(G) = r(G) but alpha(G) <(G). In the case when the graph G doesn't contain two chordless cycles C-4 with a common edge, the equality alpha(G) = r(G) implies alpha(G) = (χ) over bar (G). Corollary: the last statement holds for d(G) - the minimal dimension of the orthonormal representation of the graph G.

KW - CHROMATIC NUMBER

KW - RANK

KW - GRAPH

M3 - статья

VL - 11

JO - Electronic Journal of Combinatorics

JF - Electronic Journal of Combinatorics

SN - 1077-8926

IS - 1

M1 - 5

ER -

ID: 36371825