On the stability of some Erdős--Ko--Rado type results

Abstract: Consider classical Kneser's graph $K(n,r)$: for two natural numbers $ r, n $ such that $r \le n / 2$, its vertices are all the subsets of $[n]={1,2,\ldots,n}$ of size $r$, and two such vertices are adjacent if the corresponding subsets are disjoint. The Erd\H{o}s--Ko--Rado theorem states that the size of the largest independent set in this graph is $\binom{n-1}{r-1}$. Now let us delete each edge of the graph $K(n,r)$ with some fixed probability $p$ independently of each other. Quite surprisingly, the independence number of such random subgraph $K_p(n,r)$ of the graph $ K(n,r) $ is, with high probability, the same as the independence number of the initial graph. This phenomenon is called the stability of the independence number. This paper concerns the independence number of random subgraphs of the graph $G(n,r,1)$, which vertices are the same as in the Kneser graph and there is an edge between two vertices if they intersect in exactly one element. We prove the stability result for constant $r$ and $p=\frac{1}{2}$. To do that, we show that any sufficiently large independent set in $G(n,r,1)$ has some predefined structure, and this is a result of independent interest.