Let $E$ be a compact subset of $\mathbb{R}^n$. Let the density function $\phi(x,y)$ be Lipschitz continuous and such that $$ \int\limits_E \phi(x,y)dy=1 $$ for all $x\in E$. Let us consider the non-increasing sequence of non-empty compact sets $A_n$ such that for all $x\in A_{n+1}$ we have $$ \int\limits_{A_n} \phi(x,y)dy=1. $$ Since $A_n$ are compacts, there exists a non-empty limit set $A = \bigcap\limits_n A_n$
Do we have for all $x\in A$ that $$ \int\limits_A \phi(x,y)dy = 1? $$
Anthony's interpretation of the question is that $A_n$ is the support of $X_n$, where $(X_n)$ is any Markov chain of transition kernel $\phi$ such that the distribution of $X_0$ has support $E$. If this interpretation is correct, the result holds. To see this, note that, under the assumption that $A_1\subset E=A_0$, the sequence $(A_n)$ is nonincreasing. Let $A$ denote the intersection of all the sets $A_n$ and let $x\in A$. Since $x\in A_n$ for every $n$, $\phi(x,A_{n+1})=1$ [writing $\phi(x,B)$ for the integral of $\phi(x,\cdot)$ over $B$]. Since $A_{n+1}$ decreases to $A$, by bounded convergence, $\phi(x,A_{n+1})$ decreases to $\phi(x,A)$, and this proves that $\phi(x,A)=1$. (Thus compactness would be irrelevant. Note that the indices $n$ and $n+1$ are mixed up in the question.)
