Kahn–Kalai conjecture

Mathematical proposition

The Kahn–Kalai conjecture, also known as the expectation threshold conjecture or more recently the Park-Pham Theorem, was a conjecture in the field of graph theory and statistical mechanics, proposed by Jeff Kahn and Gil Kalai in 2006.^[1]^[2] It was proven in a paper published in 2024.^[3]

Background

This conjecture concerns the general problem of estimating when phase transitions occur in systems.^[1] For example, in a random network with $N$ nodes, where each edge is included with probability $p$ , it is unlikely for the graph to contain a Hamiltonian cycle if $p$ is less than a threshold value $(\log N)/N$ , but highly likely if $p$ exceeds that threshold.^[4]

Threshold values are often difficult to calculate, but a lower bound for the threshold, the "expectation threshold", is generally easier to calculate.^[1] The Kahn–Kalai conjecture is that the two values are generally close together in a precisely defined way, namely that there is a universal constant $K$ for which the ratio between the two is less than $K\log {\ell ({\mathcal {F}})}$ where $\ell ({\mathcal {F}})$ is the size of a largest minimal element of an increasing family ${\mathcal {F}}$ of subsets of a power set.^[3]

Proof

Jinyoung Park and Huy Tuan Pham announced a proof of the conjecture in 2022; it was published in 2024.^[4]^[3]

References

^ ^a ^b ^c "Jinyoung Park and Huy Tuan Pham Prove the Kahn-Kalai Conjecture - IAS News". Institute for Advanced Study. 2022-04-18. Retrieved 2022-04-25.
^ Kahn, Jeff; Kalai, Gil (2006-04-02). "Thresholds and expectation thresholds". arXiv:math/0603218.
^ ^a ^b ^c Park, Jinyoung; Pham, Huy Tuan (2024). "A proof of the Kahn-Kalai conjecture". Journal of the American Mathematical Society. 37 (1): 235–243. arXiv:2203.17207. doi:10.1090/jams/1028. MR 4654612.
^ ^a ^b Cepelewicz, Jordana (2022-04-25). "Elegant Six-Page Proof Reveals the Emergence of Random Structure". Quanta Magazine. Retrieved 2022-04-25.