| Title: | Weak regularity and finitely forcible graph limits |
| Authors: | Cooper, Jacob W. Kaiser, Tomáš Král', Daniel Noel, Jonathan A. |
| Citation: | COOPER, J. W., KAISER, T., KRÁL', D., NOEL, J. A. Weak regularity and finitely forcible graph limits. Transactions of the American mathematical society, 2018, roč. 370, č. 6, s. 3833-3864. ISSN 0002-9947. |
| Issue Date: | 2018 |
| Publisher: | American Mathematical Society |
| Document type: | článek article |
| URI: | 2-s2.0-85044404667 http://hdl.handle.net/11025/35700 |
| ISSN: | 0002-9947 |
| Keywords in different language: | graph limit;graphon;weak regularity;forcibility |
| Abstract in different language: | Graphons are analytic objects representing limits of convergent sequences of graphs. Lovász and Szegedy conjectured that every finitely forcible graphon, i.e. any graphon determined by finitely many subgraph densities, has a simple structure. In particular, one of their conjectures would imply that every finitely forcible graphon has a weak ε-regular partition with the number of parts bounded by a polynomial in ε^{−1}. We construct a finitely forcible graphon W such that the number of parts in any weak ε-regular partition of W is at least exponential in ε^{−2}/2^{5 log* ε^{-2}}. This bound almost matches the known upper bound for graphs and, in a certain sense, is the best possible for graphons. |
| Rights: | Plný text není přístupný. © American Mathematical Society |
| Appears in Collections: | Články / Articles (NTIS) Články / Articles (KMA) OBD |
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