Invertibility in Weak-Star Closed Algebras of Analytic Functions

For $K\subset \mathbb C$ a compact subset and $μ$ a positive finite Bore1 measure supported on $K,$ let $R^\infty (K,μ)$ be the weak-star closure in $L^\infty (μ)$ of rational functions with poles off $K.$ We show that if $R^\infty (K,μ)$ has no non-trivial $L^\infty$ summands and $f\in R^\infty (K,μ),$ then $f$ is invertible in $R^\infty (K,μ)$ if and only if Chaumat's map for $K$ and $μ$ applied to $f$ is bounded away from zero on the envelope with respect to $K$ and $μ.$ The result proves the conjecture $\diamond$ posed by J. Dudziak in 1984.