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  • Chromatic number and complete graph substructures for degree sequences
    Dvořák, Zdeněk ; Mohar, Bojan, 1956-
    Given a graphic degree sequence ▫$D$▫, let ▫$\chi(D)$▫ (respectively ▫$\omega(D)$▫, ▫$h(D)$▫, and ▫$H(D)$)▫ denote the maximum value of the chromatic number (respectively, the size of the largest ... clique, largest clique subdivision, and largest clique minor) taken over all simple graphs whose degree sequence is $D$. It is proved that ▫$\chi(D) \le h(D)$▫. Moreover, it is shown that a subdivision of a clique of order ▫$\chi(D)$▫ exists where each edge is subdivided at most once and the set of all subdivided edges forms a collection of disjoint stars. This bound is an analogue of the Hajós Conjecture for degree sequences and, in particular, settles a conjecture of Neil Robertson that degree sequences satisfy the bound ▫$\chi(D) \le H(D)$▫ (which is related to the Hadwiger Conjecture). It is also proved that ▫$\chi(D) \le \frac{6}{5} \,\omega(D) + \frac{3}{5}$▫ and that ▫$\chi(D) \le \frac{4}{5} \omega(D) + \frac{1}{5} \Delta(D) + 1$▫, where ▫$\Delta(D)$▫ denotes the maximum degree in ▫$D$▫. The latter inequality is related to a conjecture of Bruce Reed bounding the chromatic number by a convex combination of the clique number and the maximum degree. All derived inequalities are best possible.
    Vir: Combinatorica. - ISSN 0209-9683 (Vol. 33, no. 5, 2013, str. 513-529)
    Vrsta gradiva - članek, sestavni del
    Leto - 2013
    Jezik - angleški
    COBISS.SI-ID - 16922713

    Povezava(-e):

    http://dx.doi.org/10.1007/s00493-013-2649-z

vir: Combinatorica. - ISSN 0209-9683 (Vol. 33, no. 5, 2013, str. 513-529)

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