Skip to main content
Journal cover image

Phase transition of degeneracy in minor-closed families

Publication ,  Journal Article
Liu, CH; Wei, F
Published in: Advances in Applied Mathematics
May 1, 2023

Given an infinite family G of graphs and a monotone property P, an (upper) threshold for G and P is a “fastest growing” function p:N→[0,1] such that limn→∞⁡Pr⁡(Gn(p(n))∈P)=1 for any sequence (Gn)n∈N over G with limn→∞⁡|V(Gn)|=∞, where Gn(p(n)) is the random subgraph of Gn such that each edge remains independently with probability p(n). In this paper we study the upper threshold for the family of H-minor free graphs and the property of being (r−1)-degenerate and apply it to study the thresholds for general minor-closed families and the properties for being r-choosable and r-colorable. Even a constant factor approximation for the upper threshold for all pairs (r,H) is expected to be challenging by its close connection to a major open question in extremal graph theory. We determine asymptotically the thresholds (up to a constant factor) for being (r−1)-degenerate (and r-choosable, respectively) for a large class of pairs (r,H), including all graphs H of minimum degree at least r and all graphs H with no vertex-cover of size at most r, and provide lower bounds for the rest of the pairs of (r,H).

Duke Scholars

Altmetric Attention Stats
Dimensions Citation Stats

Published In

Advances in Applied Mathematics

DOI

EISSN

1090-2074

ISSN

0196-8858

Publication Date

May 1, 2023

Volume

146

Related Subject Headings

  • Applied Mathematics
  • 4904 Pure mathematics
  • 4901 Applied mathematics
  • 0102 Applied Mathematics
  • 0101 Pure Mathematics
 

Citation

APA
Chicago
ICMJE
MLA
NLM
Liu, C. H., & Wei, F. (2023). Phase transition of degeneracy in minor-closed families. Advances in Applied Mathematics, 146. https://doi.org/10.1016/j.aam.2023.102489
Liu, C. H., and F. Wei. “Phase transition of degeneracy in minor-closed families.” Advances in Applied Mathematics 146 (May 1, 2023). https://doi.org/10.1016/j.aam.2023.102489.
Liu CH, Wei F. Phase transition of degeneracy in minor-closed families. Advances in Applied Mathematics. 2023 May 1;146.
Liu, C. H., and F. Wei. “Phase transition of degeneracy in minor-closed families.” Advances in Applied Mathematics, vol. 146, May 2023. Scopus, doi:10.1016/j.aam.2023.102489.
Liu CH, Wei F. Phase transition of degeneracy in minor-closed families. Advances in Applied Mathematics. 2023 May 1;146.
Journal cover image

Published In

Advances in Applied Mathematics

DOI

EISSN

1090-2074

ISSN

0196-8858

Publication Date

May 1, 2023

Volume

146

Related Subject Headings

  • Applied Mathematics
  • 4904 Pure mathematics
  • 4901 Applied mathematics
  • 0102 Applied Mathematics
  • 0101 Pure Mathematics