Kendall's Conjecture

Kendall's Conjecture is a mathematical idea suggesting that, in large and randomly ordered systems, the chance of a set of items forming a perfect or near-perfect sequence (like all being in the right order) becomes extremely low. Essentially, as the number of items increases, perfectly sorted or neatly ordered arrangements become so rare that they are almost impossible. The conjecture explores how disorder naturally dominates large sets, highlighting the unlikely nature of perfect arrangements in complex, random systems.