Rubel's problem on bounded analytic functions
classification
🧮 math.CV
keywords
problemrubelanalyticboundedcircledeltaexistexists
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The paper shows that for any $G_\delta$ set $F$ of Lebesgue measure zero on the unit circle $T$ there exists a function $f \in H^{\infty}$ such that the radial limits of $f$ exist at each point of $T$ and vanish precisely on $F$. This solves a problem proposed by Lee Rubel in 1973.
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