• Title of article

    Minimum degree conditions for large subgraphs

  • Author/Authors

    Allen، نويسنده , , Peter and Bِttcher، نويسنده , , Julia and Hladk‎، نويسنده , , Jan and Cooley، نويسنده , , Oliver، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2009
  • Pages
    5
  • From page
    75
  • To page
    79
  • Abstract
    Much of extremal graph theory has concentrated either on finding very small subgraphs of a large graph (such as Turánʹs theorem [Turán, P., On an extremal problem in graph theory (in Hungarian), Matematiko Fizicki Lapok 48 (1941), 436–452]) or on finding spanning subgraphs (such as Diracʹs theorem [Dirac, G.A., Some theorems on abstract graphs, Proc. London Math. Soc. s3-2 (1952), 69–81] or more recently work of Komlós, Sárközy and Szemerédi [Komlós, J., G. N. Sárközy and E. Szemerédi, On the square of a Hamiltonian cycle in dense graphs, Random Struct. Algorithms 9 (1996), 193-211; Komlós, J., G. N. Sárközy and E. Szemerédi, Proof of the Seymour Conjecture for large graphs, Ann. Comb. 2 (1998), 43–60] towards a proof of the Pósa-Seymour conjecture). Only a few results give conditions to obtain some intermediate-sized subgraph. We contend that this neglect is unjustified. To support our contention we focus on the illustrative case of minimum degree conditions which guarantee squared-cycles of various lengths, but also offer results, conjectures and comments on other powers of paths and cycles, generalisations thereof, and hypergraph variants.
  • Keywords
    extremal graph theory , minimum degree , large subgraphs
  • Journal title
    Electronic Notes in Discrete Mathematics
  • Serial Year
    2009
  • Journal title
    Electronic Notes in Discrete Mathematics
  • Record number

    1455073