Suppose $A$ is a symmetric stochastic $n \times n$ matrix with least eigenvalue $\lambda_n>0$.  Consider real symmetric perturbations $\widehat{A}$.

How large can I take $\epsilon$ such that $\widehat{A}$ is invertible with $\widehat{A}^{-1} \mathbf{1} > \mathbf{0}$ for all $\widehat{A}$ with $||A-\widehat{A}||_\infty< \epsilon$?  For sure we have $\epsilon \le \lambda_n$.

I expect the answer involves $\lambda_n$ or some sort of conditioning quantity like $||A^{-1}||_\infty$.  I have a preliminary result, but my proof is elementary and ridiculous... it uses a series expansion of $(I-A)^{-1}$.  I don't think the resulting lower bound on $\epsilon$ is very good.  Can Perron-Frobenius do better somehow?

PS:  As an added challenge, I wonder if one gets a bigger $\epsilon$ with an assumption on the sign pattern of either $A^{-1}$ or $A-\widehat{A}$.